Answer: Let's assume Ms. Wells bought x pounds of bananas and (11.75 - x) pounds of oranges.
The cost of bananas is $0.40 per pound, so the cost of x pounds of bananas is 0.4x.
The cost of oranges is $0.80 per pound, so the cost of (11.75 - x) pounds of oranges is 0.8(11.75 - x).
The total cost of the fruit purchase is $8.00, so we can write:
0.4x + 0.8(11.75 - x) = 8
Simplifying this equation:
0.4x + 9.4 - 0.8x = 8
-0.4x = -1.4
x = 3.5
Therefore, Ms. Wells bought 3.5 pounds of bananas.
So the answer is (B) 3.50 pounds.
Step-by-step explanation:
Which of the following is not a solution to sin x − cos 2x = 0 on the interval [0, 2π)? A. pi over 6
B. pi over 2
C. 5 times pi over 6
C. 3 times pi over 2
None of the given options (A, B, C, or D) is a solution to sin x − cos 2x = 0 on the interval [0, 2π).
What is solution of a trigonometric equation ?The solution of any trigonometric equation represents the value of the parameter which satisfies the given equation. The solution should lie within a given range and it should have the same value as ±π .
To find the solutions to sin x − cos 2x = 0 on the interval [0, 2π), we can start by using the identity cos 2x = 1 - 2sin² x, which gives:
sin x - (1 - 2sin² x) = 0
Simplifying this equation, we get:
2sin² x - sin x + 1 = 0
We can solve this quadratic equation using the quadratic formula:
sin x = [1 ± √(1 - 8)] / 4
sin x = [1 ± √(-7)] / 4
Since the square root of a negative number is not a real number, this equation has no real solutions. Therefore, none of the given options (A, B, C, or D) is a solution to sin x − cos 2x = 0 on the interval [0, 2π).
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Identify the shapes that make up the figure at the left. Then find the perimeter and area of the figure to the nearest hundredth
The required Perimeter and area of the shape is 27.42 units and 64.26 sq units.
What is Perimeter of the shape?The circumference of a shape is its perimeter. How is a perimeter calculated? The border can be found by including the lengths of each side of a shape.
According to question:We have given a shape which made up of two circle and rectangle
diameter of circle = 12 - 6 = 6
then radius = 3 units
Perimeter = 3+3+3+3+3+3+π(3)
= 18 + 3.14(3)
= 18 + 9.42
= 27.42 units
and
Area = area of rectangle + area of two half circles
= 12(3) + π(3)²
= 36 + 28.26
= 64.26 sq units.
Thus, required Perimeter and area of the shape is 27.42 units and 64.26 sq units.
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a nutritionist selected a random sample of adults and asked them about their eating and exercise habits. the data show that people who eat organic fruits and vegetables are more likely to exercise regularly than those who do not eat organic fruits and vegetables. does this scenario describe an observational study or an experiment? this scenario describes an
In the scenario where a nutritionist selected a random sample of adults and asked them about their eating and exercise habits, the data show that people who eat organic fruits and vegetables are more likely to exercise regularly than those who do not eat organic fruits and vegetables, this scenario describes an observational study.
What is an observational study?Observational study, also known as non-experimental research, is a type of research design where researchers observe the behavior of a particular group of individuals without influencing it in any way. A researcher is not allowed to interfere with or manipulate any variables.
He just observes the environment and the behavior of the individuals under study. This is why observational studies are sometimes also referred to as naturalistic observations.
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The box plots display measures from data collected when 20 people were asked about their wait time at a drive-thru restaurant window.
A horizontal line starting at 0, with tick marks every one-half unit up to 32. The line is labeled Wait Time In Minutes. The box extends from 8.5 to 15.5 on the number line. A line in the box is at 12. The lines outside the box end at 3 and 27. The graph is titled Super Fast Food.
A horizontal line starting at 0, with tick marks every one-half unit up to 32. The line is labeled Wait Time In Minutes. The box extends from 9.5 to 24 on the number line. A line in the box is at 15.5. The lines outside the box end at 2 and 30. The graph is titled Burger Quick.
Which drive-thru is able to estimate their wait time more consistently and why?
Burger Quick, because it has a smaller IQR
Burger Quick, because it has a smaller range
Super Fast Food, because it has a smaller IQR
Super Fast Food, because it has a smaller range
The drive-thru that is able to estimate their wait time more consistently and why is: A. Burger Quick, because it has a smaller IQR.
Which drive-thru is able to estimate their wait time more consistently and why?The IQR is a measure of the spread of the middle 50% of the data, and is calculated as the difference between the third quartile (Q3) and the first quartile (Q1). A smaller IQR indicates that the data is less spread out around the median, and therefore more consistent.
In this case, the IQR for Super Fast Food is 15.5 - 12 = 3.5, while the IQR for Burger Quick is 24 - 15.5 = 8.5. Therefore, Burger Quick has a larger range (24 - 2 = 22) than Super Fast Food (27 - 3 = 24), but a smaller IQR, indicating that their wait time estimates are more consistent.
Therefore Quick is able to estimate their wait time more consistently because it has a smaller interquartile range (IQR).
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Which operation should be completed first to find the value of the expression below
The order of operations that should be completed first to find the value of given expression 12+30÷(6-3)+1 is (6-3) which is option-B
What is the correct order of operations?
To solve any given expression the rule applied is PEMDAS or the BODMAS . PEMDAS acronym for-
P indicates the parentheses that are the brackets to be solved first in an expression.
E which indicates exponents or powers to be solved.
M refers to Multiplication
D refers to divide
A refers to add
S indicates subraction
BODMAS is similar to PEMDAS whose sequence of solving stands for
B- brackets
O-Order/Of
D-Divide
M-Multiply
A-Add
S-Subtract
Here in the given expression: 12+30÷(6-3)+1 , the order would be
=12+30÷(6-3)+1
=12 + 30 ÷ (3) + 1 { brackets/parentheses}
= 12 + 30 ÷ 3 + 1
=12 + 10 + 1 {divide}
=23
∴ the first operation was to solve brackets/parentheses (6-3)
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Refer to the attachment below for complete question.
Pls help 1/6 (x + 18) = -5.
Answer:
x= -48
Step-by-step explanation:
find the mode of the data set: 10, 18, 13, 22, 10, 13, 10, 19
Answer: The mode in this data set would be 10.
Step-by-step explanation: Mode is the most frequent number—that is, the number that occurs the highest number of times. Example: The mode of {4 , 2, 4, 3, 2, 2} is 2 because it occurs three times, which is more than any other number.
Answer: The mode is 10.
Step-by-step explanation: To find the mode of a data set, you need to determine which number appears most frequently. In your case, the number 10 occurs three times, but all other numbers appear only once or twice. So, the mode is 10.
Choose the correct measurement of the paper clip to the nearest 1/8 inch
1 1/2 inch
7/8 inch
1 2/8 inch
1 4/8 inch
1 3/8 inch
Choose the correct measurement of the paper clip to the nearest 1/8 inch
1 1/2 inch
7/8 inch
1 2/8 inch
1 4/8 inch
1 3/8 inch
A convex polygon looks like it collapsed or has indentations.
True
False
Answer:
False
Step-by-step explanation:
Because it is convex, that is, it has bulges
How Much wood if bedded to build the birdhouse below
Answer: I'm not sure what birdhouse you're talking about, but I'll tell you the average amount of wood that would be needed to build a birdhouse.
Many cavity-nesting birds will add their own nest material, but the woodpeckers, waterfowl and owls prefer nest boxes with 2-3 inches of dry sawdust or woodchips in the bottom.
The scatterplot below shows a set of data points.
On a graph, points are grouped together and increase slightly.
Which statement about the scatterplot is true?
The scatterplot does not have a cluster, and the variables are not related.
The scatterplot does not have a cluster, and the variables are related. As x increases, y increases.
The scatterplot has a cluster, and the variables are not related.
The scatterplot has a cluster, and the variables are related. As x increases, y increases.
Using the scatter plot, we can see that the scatter plot has a cluster, and the variables are related. As x increases, y increases.
What is a scatter plot?The scatter plot is reportedly one of the statistical graphs' most useful discoveries. John Frederick W. Herschel, an English scientist, initially proposed the scatter plot in 1833. Herschel used it to look at the orbits of the double stars. He plotted the direction of the double star with relation to the measurement year. The scatter plot was used to interpret the key link between the two measurements. The scatter plot continues to rule in both business and science, despite the widespread use of bar charts and line plots. The relationship between the points on a scale can be easily understood by merely glancing at them.
Here in the graph shown,
Two clusters can be seen in the scatterplot, and their variables are related. Y increases, but the growth is gradual, as x increases in the bottom one. As x rises in the top cluster, y rises as well, but more quickly.
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The relationship between variables, and any patterns or trends in the scatterplot, researchers and analysts can gain a deeper understanding of the data they are working with.
A scatterplot is a graphical representation of a set of data points, where each point represents an observation or measurement of two variables. Scatterplots are commonly used to visualize the relationship between two variables. The scatterplot can reveal whether there is a correlation or relationship between the two variables.
When examining a scatterplot, there are a few key things to look for. One important aspect is the presence of a cluster. If there is a cluster of points in the scatterplot, it may indicate that there is a group of observations that share similar characteristics.
Additionally, it is important to determine whether the variables on the scatterplot are related or not. If the variables are not related, there will be no discernible pattern in the scatterplot. However, if the variables are related, there will be a pattern or trend visible in the scatterplot.
In cases where there is a positive correlation, as x increases, y increases as well. This is seen as a positive slope or trend line in the scatterplot. It is important to note that correlation does not necessarily imply causation, and further analysis may be required to understand the underlying factors influencing the relationship between the two variables.
Overall, scatterplots are a powerful tool for visualizing and analyzing data, and can provide valuable insights into the relationship between two variables. By understanding the presence of clusters,
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write the absolute value equations in the form of absolute value of x - b = c that has the following solutions sets x is less than or equal to 5
The equatiοn |x - 5| = 0 means the distance between x and 5 is zerο, which implies that x = 5. And since x is less than οr equal tο 5, the sοlutiοn set is x = {5}.
What is the absοlute value equatiοns?An absοlute value equatiοn is an equatiοn that cοntains an absοlute value expressiοn. An absοlute value expressiοn is the distance οf a number frοm zerο οn a number line, and it is represented by twο vertical bars enclοsing the number, like |x|.
The equatiοn in the fοrm οf |x - b| = c that has the sοlutiοn set x ≤ 5 is:
|x - 5| = 0
Tο see why, cοnsider that |x - 5| is the distance between x and 5 οn the number line.
Hence, the equatiοn |x - 5| = 0 means the distance between x and 5 is zerο, which implies that x = 5. And since x is less than οr equal tο 5, the sοlutiοn set is x = {5}.
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Enter the resulting inequality.
10 > −1; Subtract 10 from both sides.
whats the resulting inequality ?
given the following all-integer linear program: max 15x1 2x2 s. t. 7x1 x2 < 23 3x1 - x2 < 5 x1, x2 > 0 and integer a. solve the problem as an lp, ignoring the integer constraints. b. what solution is obtained by rounding up fractions greater than or equal to 1/2? is this the optimal integer solution? c. what solution is obtained by rounding down all fractions? is this the optimal integer solution? explain. d. show that the optimal objective function value for the ilp (integer linear programming) is lower than that for the optimal lp. e. why is the optimal objective function value for the ilp problem always less than or equal to the corresponding lp's optimal objective function value? when would they be equal? comment on the optimal objective function of the milp (mixed-integer linear programming) compared to the corresponding lp and ilp.
The required solution of the linear programming problem for the given objective function and subject to constraints are,
Linear programming problem is Maximize 15x1 + 2x2
Subject to:
7x1 + x2 < 23
3x1 - x2 < 5
x1, x2 > 0
Objective function value for rounding up fraction 1/2 solution is 53
Objective function value for rounding up all fraction solution is 23.
Optimal objective function value 53 is lower than optimal value 95.5.
Optimal objective function value is always less than or equal to the LP's optimal objective function value as ILP problem is a more constrained version.
To solve the problem as an LP,
we can ignore the integer constraints
And solve the problem as a continuous linear program.
The problem can be written as,
Maximize 15x1 + 2x2
Subject to:
7x1 + x2 < 23
3x1 - x2 < 5
x1, x2 > 0
Rounding up fractions greater than or equal to 1/2,
The following feasible solution is,
x1 = 3, x2 = 4
The objective function value for this solution is 53.
However, this is not the optimal integer solution since both x1 and x2 are not integers.
Rounding down all fractions, we get the following feasible solution,
x1 = 1, x2 = 4
The objective function value for this solution is 23, which is less than the LP's optimal objective function value of 95.5.
This is not the optimal integer solution either.
Optimal objective function value for the ILP is lower than that for the optimal LP, solve the ILP problem.
In any one constraints
When x1 = 0 ⇒ x2 = 23
x2 = 0 ⇒ x1 = 3.3
Optimal value is ,
15(3.3) + 2(23)
= 49.5 + 46
= 95.5
Optimal objective function value is lower than optimal value.
The optimal objective function value for the ILP problem is always less than or equal to the corresponding LP's optimal objective function value .
Because the ILP problem is a more constrained version of the linear programming problem.
The ILP problem restricts the variables to be integers, which reduces the feasible region and makes the problem more difficult to solve.
The optimal objective function values for the LP and ILP problems are equal.
If the LP problem has an optimal solution that satisfies the integer constraints.
In general, the optimal objective function value of the MILP problem can be better or worse than that of the LP or ILP problem.
It depends on the specific problem instance.
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The above question is incomplete, the complete question is :
Given the following all-integer linear program:
Max 15x1 + 2x2
s. t.
7x1 + x2 < 23
3x1 - x2 < 5
x1, x2 > 0 and integer
a. solve the problem as an lp, ignoring the integer constraints.
b. what solution is obtained by rounding up fractions greater than or equal to 1/2? is this the optimal integer solution?
c. what solution is obtained by rounding down all fractions? is this the optimal integer solution? explain.
d. show that the optimal objective function value for the ilp (integer linear programming) is lower than that for the optimal lp.
e. why is the optimal objective function value for the ilp problem always less than or equal to the corresponding lp's optimal objective function value? when would they be equal? comment on the optimal objective function of the milp (mixed-integer linear programming) compared to the corresponding lp and ilp.
Grace always brings her own shopping bags to buy fruits. a bag with 68 guavas in it has a mass of 7.55 kg. the same bag with 62 guavas in it has a mass of 6.95 kg. find the mass of the bag when it is empty in grams.
To solve the problem, we can use the following steps:
Determine the difference in mass between the two bags with different numbers of guavas:
Mass of bag with 68 guavas = 7.55 kg Mass of bag with 62 guavas = 6.95 kg Difference in mass = 7.55 kg - 6.95 kg = 0.6 kg
Determine the mass of the 6 extra guavas:
Mass of 6 guavas = ? We can assume that the mass of each guava is roughly the same, so the mass of 6 guavas is proportional to the difference in mass between the two bags:
Difference in mass = 0.6 kg Mass of 6 guavas / 6 = 0.6 kg / 6 Mass of 6 guavas = 0.1 kg
Subtract the mass of the 6 extra guavas from the mass difference to get the mass of the bag:
Mass of bag with no guavas = ? Mass of bag with 68 guavas - mass of bag with 62 guavas = Mass of 6 extra guavas + Mass of bag with no guavas 0.6 kg - 0.1 kg = Mass of bag with no guavas Mass of bag with no guavas = 0.5 kg
Convert the mass of the bag from kilograms to grams:
Mass of bag with no guavas = 0.5 kg = 500 g
Therefore, the mass of the bag when it is empty is 500 grams.
a snack hut is selling fruit smoothies at the beach. the cost of a smoothie is 3 dollars and an additional 1.50 for each fruit you add. your friend writes the equation y=3+1.5x and says the slope of the line that represents this relationship is 3.
The y-intercept (b) represents the starting cost of the smoothie (when no fruits are added), which is $3 in this case.
What is Algebraic expression?An algebraic expression is a mathematical phrase that can contain variables, constants, and operators (such as addition, subtraction, multiplication, and division) that are used to represent quantities and their relationships.
The equation y = 3 + 1.5x represents the relationship between the total cost of a fruit smoothie (y) and the number of fruits added to it (x).
The slope of this line is not 3, as your friend suggests. The slope of the line is actually 1.5, which represents the cost per fruit added.
To see this, we can rewrite the equation in slope-intercept form, y = mx + b, where m is the slope and b is the y-intercept:
y = 1.5x + 3
In this form, we can clearly see that the slope (m) is 1.5, not 3. The slope represents the rate of change of the y variable (cost) with respect to the x variable (number of fruits added), which is $1.50 per fruit.
Therefore, The y-intercept represents the starting cost of the smoothie (when no fruits are added), which is $3 in this case.
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Complete question:
A snack hut is selling fruit smoothies at the beach. the cost of a smoothie is 3 dollars and an additional 1.50 for each fruit you add. your friend writes the equation y=3+1.5x and says the slope of the line that represents this relationship is 3. What does the y-intercept represent here.
help asap assignment closes soon!
The volume of the cone is approximately 12π cubic feet
What is the volume of a cone?
[tex]V = \frac{1}{3} \pi {r}^{2}h[/tex] where r is the radius of the base and h is the height of the cone.
In this case, the base of the cone is a square with a side length of b = 4 ft. The radius of the base is half the length of a side of the square, so:
[tex]r = \frac{b}{2} = \frac{4}{2} = 2 \: ft[/tex]
The height of the cone is h = 9 ft.
Now we can substitute these values into the formula for the volume of a cone:
[tex]V = \frac{1}{3} \times \pi {r}^{2} h \\V = \frac{1}{3} \pi {2}^{2} \times 9 \\ V = \frac{1}{3}\pi \times 4 \times 9 \\ V = \frac{1}{3} \times \pi \times 36 \\ V = 12\pi[/tex]
So the volume of the cone is approximately 12π cubic feet.
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Solven16. Which of the following must be true about the inequality and the resulting graph? Select three
options.
Ons-24
Onz-24
OThe circle is open.
OThe circle is closed.
OThe arrow points right.
The true statements about the inequality are
n > -24.
The circle is open.
The arrow points right.
How to solve the inequalityTo solve for n in the inequality -2/3n < 16, we need to isolate the variable n on one side of the inequality.
First, we can multiply both sides by -3/2 to get rid of the fraction:
(-3/2) * (-2/3n) > (-3/2) * 16
n > -24
Therefore, the solution for n in the inequality -2/3n < 16 is n > -24.
The circle is open means that the inequality sign is either less than or greater than
Having greater that means it points to the right
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A survey of 15 students revealed that 9 students brought their lunch from home, and 6 students bought their lunch in the cafeteria. Based on this information, If there are 500 students in the school, how many students could be expected to bring their lunch?
We can use a proportion to estimate the number of students who could be expected to bring their lunch:
9 out of 15 students brought their lunch from home.
Let x be the number of students in the school who bring their lunch from home.
So we can set up the proportion:
9/15 = x/500
We can solve for x by cross-multiplying:
9 * 500 = 15x
x = (9 * 500) / 15
x = 300
Therefore, we can expect that 300 out of 500 students in the school bring their lunch from home.
What is the Standard Form after distribution of (x+3) (x-3)
Answer (Please mark as brainliest):
x^2 - 9
Step-by-step explanation:
To distribute (x+3) (x-3), we use the FOIL method:
(x+3)(x-3) = x(x) + x(-3) + 3(x) + 3(-3)
= x^2 - 3x + 3x - 9
= x^2 - 9
The standard form of a quadratic equation is ax^2 + bx + c = 0, where a, b, and c are constants and a is not equal to 0.
In this case, the equation is already in standard form since there is only one term with x^2 and no x or constant terms:
x^2 - 9
every day, kymere takes the same street from his home to the university. there are multiple traffic lights with patterns along the way. if there is a green light while passing through an intersection, then 60% of the time the next light is also green and 25% of the time the next light is red. if the light is yellow, then there is a probability of 1 that the next light is red. if there is a red light, then 30% of the time the next light is green and 50% of the time the next light is red. (a) does this situation represent a markov chain? explain. (b) set up the transition probability matrix and diagram. (c) determine the number of classes and classify them. (d) the first light is green. compute and interpret all probabilities after three more lights. (e) if kymere has many street lights between home and the university, what proportion of these lights are green, yellow, and red? [no technology estimations permitted. solve this problem with a system of equations showing every step and fraction answers only.]
a) Yes. (b) G Y R
G [0.60 0.00 0.40]
Y [1.00 0.00 0.00]
R [0.30 0.20 0.50]
(c) P(G, G, G, G) = 0.216. P(G, G, G, Y)= 0.144. P(G, G, G, R) = 0.120. P(G, G, Y, R) = 0.000. P(G, Y, R, R) = 0.000. P(Y, R, R, R) = 0.000
(a) Yes, this situation represents a Markov chain because the probabilities of moving to the next state (traffic light) depend only on the current state (traffic light) and not on any previous states.
(b) The transition probability matrix is:
G Y R
G [0.60 0.00 0.40]
Y [1.00 0.00 0.00]
R [0.30 0.20 0.50]
where G represents green, Y represents yellow, and R represents red. The transition diagram can be drawn with arrows between states labeled with the transition probabilities.
(c) There are two classes: {G, Y} and {R}, where {G, Y} is a transient class and {R} is an absorbing class.
(d) Starting with the first light being green, the probabilities after three more lights are:
P(G, G, G, G) = 0.60 * 0.60 * 0.60 = 0.216
P(G, G, G, Y) = 0.60 * 0.60 * 0.40 = 0.144
P(G, G, G, R) = 0.60 * 0.40 * 0.50 = 0.120
P(G, G, Y, R) = 0.60 * 0.00 * 0.50 = 0.000
P(G, Y, R, R) = 0.00 * 0.50 * 0.30 = 0.000
P(Y, R, R, R) = 0.00 * 0.50 * 0.50 = 0.000
The interpretation of these probabilities is, for example, that the probability of passing through four consecutive green lights is 0.216, and the probability of passing through three consecutive green lights followed by a yellow light is 0.144.
(e) Let p_G, p_Y, and p_R be the proportions of green, yellow, and red lights, respectively. Then we have the system of equations:
0.60 p_G + 0.00 p_Y + 0.40 p_R = p_G
1.00 p_Y + 0.00 p_Y + 0.00 p_R = p_Y
0.30 p_G + 0.20 p_Y + 0.50 p_R = p_R
p_G + p_Y + p_R = 1
Solving this system of equations, we get:
p_G = 0.44
p_Y = 0.14
p_R = 0.42
Therefore, approximately 44% of the street lights are green, 14% are yellow, and 42% are red.
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The data in this graph represent how long it took a child to complete a puzzle based on its number of pieces.
How many pieces were in the puzzle that took the child 30 seconds to complete?
Enter your answer in the box.
pieces
Coordinate plane titled Puzzle Completions with five points. The x-axis extends from 0 to 13 by ones and is labeled Number of pieces. The y-axis extends from 0 to 50 by fives and is labeled Time (seconds). Points are above the 4 on the x-axis and to the right of the 15 on the y-axis, above the 5 on the x-axis and to the right of the 15 on the y-axis, above the 7 on the x-axis and to the right of the 30 on the y-axis, above the 8 on the x-axis and to the right of the 25 on the y-axis, and above the 12 on the x-axis and to the right of the 40 on the y-axis.
There were 7 number of pieces that were in the puzzle that took the child 30 seconds to complete,that can be found using the data given & the coordinates on the graph (7,30) which indicates the number of pieces as 7 and time as 30 sec.
What is data?
Data is the collected information that can be arranged and used for analysing or interpretation. The collected data is also called as raw data, which further needs to be arranged. The data can be represented visually, in tabular form , grouped or ungrouped form. Pictographs, bargraphs, box-whisker plot, line plot, histogram, pie chart are the visual representations.
Here given that the data is arranged in the form of graph containing x-axis & y-axis. Data collected/arranged represents the number of pieces contained in the puzzle & the time taken to solve it.
X-axis represents the number of pieces in the puzzle & Y-axis represents the time taken to complete that.
The points plotted on graph are:
(4,15): Number of pieces=4
Time taken to complete=15 seconds
(5,15):Number of pieces=5
Time taken to complete=15 seconds
(7,30): Number of pieces=7
Time taken to complete=30 seconds
(8,25): Number of pieces=8
Time taken to complete=25 seconds
(12,40): Number of pieces=12
Time taken to complete=40 seconds
∴The puzzle that was completed by child in 30 seconds contained 7 pieces.
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Refer to the attachment for the graph.
lily is using dark power crystals to raise an army of zombies. each crystal can raise 9 99 zombies. how many crystals does lily need to raise 6 , 174 6,1746, comma, 174 zombies?
Lilly needs 686 dark power crystals to raise 6174 zombies.
To solve this problem, we need to determine how many dark power crystals are needed to raise a specific number of zombies. We know that each crystal can raise 9 zombies. So, to determine the number of crystals needed to raise a given number of zombies, we simply divide that number by 9.
In this case, we want to know how many crystals Lilly needs to raise 6174 zombies. So we divide 6174 by 9
= 6174 / 9
Divide the numbers
= 686
This means that Lilly needs 686 dark power crystals to raise 6174 zombie
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The given question is incomplete, the complete question is:
Lilly is using dark power crystals to raise an army of zombies.each crystal can raise 9 zombies. how many crystal does Lily need to raise 6174 zombies
how many 6-digit numbers (using 1,2,3 , ... ,9) are there if repetition is not allowed? how many are there which have at least one digit repeated?
Total 6-digit numbers that can be made from 1 to 9 will be 60480 and without repetition will be 84. The numbers that have at least one digit repeated will be 60396.
There are 9 digits from 1 to 9. If the digits are not repeated, the combination is called simple combination and is calculated using the formula
C(n, r) = n!/ r!(n-r)!
Here n= 9 and r = 6
C(9, 6) = 9!/6!(9-6)! = 9!/ (6! × 3!) = 84
So without repeating the digits there are 84 six digit numbers using 1 to 9.
Total numbers that can be made with or without repetition of digits is calculated by using permutations. The formula is
P( n, r) = n!/(n-r)!
= 9!/(9-6)! = 60480
So total number without repetition = 84
Number with or without repetition = 60480
So the total numbers that have at least one digit repeated will be = 60480 - 84 = 60396
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Cynthia has earned $1,000 and wants to put it in a savings account that earns 5% simple interest. Assuming she makes no additional deposits or withdrawals, which represents the total value of Cynthia’s account after 48 months?
Answer:
1,200
Step-by-step explanation:
The formula for Simple Interest is I=prt p=principal r=rate expressed as decimal t=time in years
I=1,000*0.05*4
0.05 because 5% in decimal form it’s 0.05
4 because 48months dived by 12= 4 years
200=1,000*0.05*4 The interest is 200 but they are asking for the total value so then you add the amount you initiated with 1,000+200=1,200
Help a girl out pleasee it’s math
The solution set for x + 10 ≥ 14 is x ≥ 4, and it can be represented as graph as a shaded region to the right of x = 4 on a number line.
The inequality [tex]x + 10 \geq 14[/tex] can be solved algebraically as follows:
[tex]x + 10 \geq 14[/tex]
Subtracting 10 from both sides, we get:
[tex]x \geq 4[/tex]
This means that any value of x that is greater than or equal to 4 will satisfy the inequality. To graph the solution, we can draw a number line and shade in all the values of x that satisfy the inequality. Since x is greater than or equal to 4, we can represent the solution set as follows:
────●────●────●────●────●───> x
0 1 2 3 4
The dot at x = 4 indicates that 4 is included in the solution set (since the inequality is "greater than or equal to"), and the shaded region to the right of the dot represents all values of x that are greater than 4 and satisfy the inequality.
Therefore, the solution set for [tex]x + 10 > = 14[/tex] is[tex]x \geq 4[/tex], and it can be represented as graph as a shaded region to the right of x = 4 on a number line.
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An investor puts $4,500 into a life insurance policy that pays 6.5% simple annual interest. If no additional investment is made into the policy, how much accumulated interest should the investor expect at the end of 6 years?
The accumulated interest the investor should expect at the end of 6 years is $1,755.00.
in the game of roulette, a steel ball is rolled onto a wheel that contains 18 red, 18 black, and 2 green slots. If the ball is rolled 23 times, find the probability of the following events.
A. The ball falls into the green slots 2 or more times.
Probability =
B. The ball does not fall into any green slots.
Probability = .288359853
C. The ball falls into black slots 14 or more times.
Probability =
D. The ball falls into red slots 12 or fewer times.
Probability
The probability of the ball falling into red slots 12 or fewer times in 23 rolls is approximately 0.3486.
A. Using the binomial probability formula, we can determine the likelihood that the ball will land in the green slots two or more times out of 23 rolls:
[tex]P(X > = 2) = 0 - 1 - P(X = 0)[/tex]
where P(X): likelihood that X will occur and X is the number of times the ball has fallen into the green slots.
The chances of the ball landing in a green slot on one roll are 2/38, whereas the chances of it not landing there are 36/38. This allows us to compute:
[tex]P(X = 0) = (36/38)^(23) = 0.288359853[/tex]
[tex]P(X = 1) = 23 * (2/38) * (36/38)^(22) = 0.357973143[/tex]
With the binomial probability formula substituted, we obtain:
[tex]P(X > = 2) = 1 - 0.288359853 - 0.357973143 = 0.353666004[/tex]
As a result, there is a roughly 0.3537 percent chance that the ball will land in the green slots two or more times during the course of 23 rolls.
B. The likelihood that the ball will not land in any green slots after 23 rolls is:
[tex]P(not green) = (36/38)23, or 0.288359853[/tex]
Hence, there is a roughly 0.2884 percent chance that the ball won't land in any green slots after 23 rolls.
B. Using the binomial probability formula, we can determine the likelihood that the ball will land in the black slots 14 or more times:
[tex]P(X > = 14) = 1 - P(X < = 13)[/tex]
where P(X): likelihood that X will occur and X is the number of times the ball has fallen into the black slots.
The odds of the ball not falling into a black slot in one roll are 20/38, while the odds of the ball going into a black slot are 18/38. This allows us to compute:
[tex]P(X = 13) = sum of (23 pick I (18/38)*i* (20/38)*(23-i) from i=0 to 13 = 0.829288657[/tex]
With the binomial probability formula substituted, we will get:
[tex]P(X > = 14) = 1 - 0.829288657 = 0.170711343[/tex]
The likelihood of the ball landing in the black slots 14 or more times during the course of 23 rolls is therefore roughly 0.1707.
D. Using the binomial probability formula once more, we can determine the likelihood of the ball landing in the red slots 12 or fewer times:
[tex]P(X = 12) = sum of (23 pick I from i=0 to 12 * (18/38) * I * (20/38) * (23-i) = 0.348609995[/tex]
The likelihood that the ball will land in a red slot 12 or fewer times in 23 rolls is therefore roughly 0.3486.
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Find the area of the trapezoid by decomposing it into other shapes.
The area of the trapezoid by decomposing it into other shapes is 55 sq. cm.
What is a trapezoid?A quadrilateral with at least one set of parallel sides is known as a trapezium. The trapezoid's other two sides are referred to as its legs, and its parallel sides are known as its bases. The distance between the bases of a trapezium measured perpendicularly is its height. By multiplying the average of the bases (the total of the bases divided by 2) by the height, one may get the area of a trapezium. A = (b1 + b2)h/2, where b1 and b2 are the lengths of the bases and h is the height, is the formula for a trapezoid's surface area.
The trapezoid can be divided into one right angles triangle and a trapezium.
The area of the triangle is given as:
A1 = 1/2 bh
A1 = 1/2(5)(4)
A1 = 10 sq. cm.
Now, the area of trapezium is given as:
A2 = 1/2 h (a + b)
Here, a = 12, b = 15 - 5 = 10, and h = 4.
A2 = 1/2 (4) (12 + 10)
A2 = 2(22) = 44 sq. cm
The total area of the trapezoid is:
A = A1 + A2
A = 10 + 44
A = 55 sq. cm.
Hence, the area of the trapezoid by decomposing it into other shapes is 55 sq. cm.
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In the expression 5xy7, what value of y would make a product greater than 5
According to the given information, any value of y greater than 1/35 would make the product 5xy7 greater than 5 when x = 1.
What is an algebraic expression?
An algebraic expression is a mathematical phrase that can contain numbers, variables, and mathematical operations such as addition, subtraction, multiplication, and division.
The expression 5xy7 can be interpreted as 5 times x times y times 7. To make the product greater than 5, we need to find a value of y such that:
5xy7 > 5
Dividing both sides by 5 and 7, we get:
xy > 1/7
So, we need to find a value of y such that the product xy is greater than 1/7. The value of x is not given, so we can assume that it is a positive number.
For example, if we choose x = 1, then we need to find a value of y such that:
y > 1/35
Therefore, any value of y greater than 1/35 would make the product 5xy7 greater than 5 when x = 1.
If we choose a different value of x, we would get a different inequality, but the general idea is the same: we need to find a value of y such that the product xy is greater than a certain value (in this case, 1/7 divided by 5 times 7).
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