The volume of the cone is approximately 26.1 cubic inches.
What is the equation used to calculate the volume of a cone with a radius of 2.5 inches and a height of 4.2 inches?The formula used to calculate the volume of a cone is:
V = (1/3) × π ×[tex]r^2[/tex] × h
where V is the volume of the cone, r is the radius of the base of the cone, h is the height of the cone, and π is a mathematical constant that is approximately equal to 3.14.
Part b. Plugging in the given values, we get:
V = (1/3) × 3.14 ×[tex]2.5^2[/tex]× 4.2
V = (1/3) × 3.14 × 6.25 × 4.2
V = 26.125 cubic inches (rounded to the nearest tenth)
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At the school bookstore, Rylan bought two spiral notebooks and one folder and paid $6. 70. Olivia bought three spiral notebooks and five folders and paid $12. 85. Find the cost of each folder
To find the cost of each folder, we need to first set up a system of equations based on the given information. Let x be the cost of a spiral notebook and y be the cost of a folder. We can create the following equations:
1) 2x + y = $6.70 (Rylan's purchase)
2) 3x + 5y = $12.85 (Olivia's purchase)
First, we can solve equation 1 for y:
y = $6.70 - 2x
Next, substitute this expression for y into equation 2:
3x + 5($6.70 - 2x) = $12.85
Now, solve for x:
3x + $33.50 - 10x = $12.85
Combine like terms:
-7x = -$20.65
Now, divide by -7:
x = $2.95
Now that we know the cost of a spiral notebook, we can plug this value back into the expression we found for y:
y = $6.70 - 2($2.95)
y = $6.70 - $5.90
y = $0.80
So, the cost of each folder is $0.80.
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you are given that 4a - 2b = 10 and a + c = 3
write an expression in a,b and c that is equal to 23
give your answer in it's simplest form
Answer:
3a - 2b - c + 16 = 23
Step-by-step explanation:
so we want to write an equetion which containe a, b and c so we have given
4a - 2b = 10 and a + c = 3
so we are going to differentiate 10 to 7 + 3 it will be
4a - 2b = 10
4a - 2b = 7 + 3 ...then we insert a + c in place of 3 b/c they are equal
4a - 2b = 7 + a + c .... we take to the left side of the equal sighn
4a - a - 2b - c = 7
3a - 2b - c = 7
thrn if we want to write the equetion =23 we add 16 both side 3a - 2b - c + 16 = 23 .
Reading
proportional relationships - part 1
do the values in the table represent a proportional relationship?
х
0
1
2.
3
y
0
3
5
6
select from the drop-down menu to correctly complete the statement.
all of the y-values choose...
a constant multiple of the corresponding x-values, so the relationship choose...
1
2
3
4
5
6
7
8
9
10
next
No, the values in the table do not represent a proportional relationship because the y-values are not a constant multiple of the corresponding x-values.
Based on the given table:
x | 0 | 1 | 2 | 3
y | 0 | 3 | 5 | 6
The values in the table do not represent a proportional relationship. To be proportional, all of the y-values should be a constant multiple of the corresponding x-values. However, in this case, the ratio of y/x is not constant (3/1, 5/2, 6/3). Therefore, the relationship is not proportional.
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At the performance of Seussical the Musical at your local high school, there are adult tickets and student/child tickets. You're trying to remember the cost of each to tell your music extended family to come see the musical. Your friend, her mom, and her little sister paid a total of $23 on opening night, and you know that another family paid $39 for two adults and three students. If x is cost of adult tickets and y is cost of student tickets, the two equations for these situations can be written as:
The cost of an adult ticket is $9 and the cost of a student/child ticket is $7. The solution was found by solving a system of two equations, where the variables x and y represent the costs of the two types of tickets.
Let's assign variables for the unknowns
x = cost of adult tickets
y = cost of student/child tickets
From the given information, we can create two equations
Equation 1 Friend, mom, and little sister paid a total of $23
x + 2y = 23
Equation 2 Another family paid $39 for two adults and three students
2x + 3y = 39
We now have two equations with two unknowns, which we can solve using substitution or elimination.
Here, using substitution
Solve for x in Equation 1
x = 23 - 2y
Substitute the value of x into Equation 2
2(23 - 2y) + 3y = 39
Simplify and solve for y
46 - 4y + 3y = 39
-y = -7
y = 7
Substitute the value of y into Equation 1 to solve for x
x + 2(7) = 23
x = 9
Therefore, the cost of adult tickets is $9 and the cost of student/child tickets is $7.
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Buying three movie tickets and a popcorn, which costs $5.50, is the same price as buying two tickets snacks worth a total of 16.50. How much does one movie ticket cost
If buying three movie tickets and a popcorn, which costs $5.50, is the same price as buying two tickets snacks worth a total of 16.50, one movie ticket costs $2.20.
Let the cost of one movie ticket be represented by x.
According to the problem, buying three movie tickets and a popcorn costs $5.50, so we can set up the equation:
3x + $5.50 = 2y
where y is the cost of snacks.
Similarly, buying two tickets and snacks worth a total of $16.50 can be represented by the equation:
2x + y = $16.50
We can solve this system of equations by substituting the first equation into the second equation for y:
2x + (3x + $5.50) = $16.50
5x + $5.50 = $16.50
5x = $11
x = $2.20
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Digitization positional errors may be less (say 2 meters) than the required positional accuracy of the data (say 5 meters) yet still prevent:
it is crucial to ensure that data collection methods and instruments meet the required accuracy standards.
How can Digitization positional errors can still be prevented?
Digitization positional errors can still prevent accurate analysis or decision making even if they are less than the required positional accuracy of the data. This is because the accuracy of the output or results depends on the accuracy of the input data.
For example, suppose a GPS receiver is used to collect data on the location of a pipeline, and the positional accuracy requirement is 5 meters. However, due to various factors such as signal interference or poor satellite coverage, the receiver only achieves an accuracy of 2 meters. Even though the positional error is less than the required accuracy, the resulting data may still be insufficient for the intended purpose, such as accurately identifying potential hazards or planning maintenance activities.
Inaccurate data can lead to wrong decisions, increased risks, and financial losses. Therefore, it is crucial to ensure that data collection methods and instruments meet the required accuracy standards.
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Digitization positional errors may be less (say 2 meters) than the required positional accuracy of the data (say 5 meters) yet still prevent achieving the desired level of accuracy for the intended use of the data.
Homework:section 6c homework question 13, 6.c.21 hw score: 60%, 12 of 20 points points: 0 of 1 question content area top part 1 the scores on a psychology exam were normally distributed with a mean of 68 and a standard deviation of 9 . about what percentage of scores were less than 50?
For a normal distribution with a mean of 68 and a standard deviation of 9, the percentage of scores less than 50 is 2.28%.
It is given that scores on a psychology exam have a normal distribution with a mean of 68 and a standard deviation of 9. The percentage of scores less than 50 can be determined as follows.
1. Calculate the z-score for 50 using the formula:
z = (X - μ) / σ
where
X = 50 (the value we're comparing to)
μ = 68 (mean)
σ = 9 (standard deviation)
2. Plug in the values:
z = (50 - 68) / 9 = -18 / 9 = -2
3. Use a z-table or calculator to find the area to the left of z = -2. This represents the percentage of scores less than 50.
4. Based on the z-table or calculator, the area to the left of z = -2 is approximately 0.0228, which means that around 2.28% of scores were less than 50.
So, about 2.28% of scores on the psychology exam were less than 50.
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A cube has a volume of 200cm3. What is the length of one edge?
Give your answer in cm correct to one decimal place
Answer:
The answer is 5.8cm to 1 d.p
Step-by-step explanation:
volume of cube=L³
200=L³
cube root both sides
³√200=³√L³
L=5.8cm to 1 d.p
An aircraft leaves a town &(28n, 66°E)
and after flying 3900km due South, it
gets to another town Y calculate,
a. The radius of the line of latitude through X
the latitude of Y Correct to the nearest
degree.
(the radius of the line of latitude through Y
(Take t=2 and R=6406 km)
The radius of the line of latitude through X is approximately 5729 km, and the latitude of Y is approximately 43°.
Let X be the starting town with coordinates (28°N, 66°E), and let Y be the destination town which is 3900 km due South of X. We want to find the radius of the line of latitude through X, and the latitude of Y.
First, we can find the distance between X and Y using the Pythagorean theorem. The distance due South is 3900 km, and the distance due East is 28° × R, where R is the radius of the Earth. Using t=2 and R=6406 km, we have:
distance due East = 28° × 6406 km × cos(66°) ≈ 2055.6 km
distance between X and Y = sqrt((3900 km)^2 + (2055.6 km)^2) ≈ 4498.6 km
Next, we can find the latitude of Y using the formula:
latitude of Y = 90° - arctan(distance due South / radius of the Earth)
Using t=2 and R=6406 km, we have:
latitude of Y = 90° - arctan(3900 km / 6406 km) ≈ 43°
Finally, we can find the radius of the line of latitude through X using the formula:
radius of line of latitude = radius of the Earth * cos(latitude of X)
Using the coordinates of X, we have:
latitude of X = 28°N
radius of line of latitude = 6406 km * cos(28°) ≈ 5729 km
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PLEASE HELP! PHOTO ATTACHED
The total area of the figure is 215π square feet
Calculating the total area of the figureFrom the question, we have the following parameters that can be used in our computation:
Radius, r = 5 cm
Height, h = 14 cm
So, we have
A1 = πr²
A1 = π * 5² = 25π
A2 = 2πrh
A2 = 2 * π * 5 * 14 = 140π
A3 = 1/2(4πr²)
A3 = 1/2(4π * 5²) = 50π
So, we have
Total area = 25π + 140π + 50π
Evaluate
Total area = 215π
Hence, the total area is 215π
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What is a way you can find the vaule of x
Answer:To find the value of x, bring the all the variable to the left side and bring all of the remaining values to the right side. You then simplify the values to find the answer.
Step-by-step explanation:
Answer:
im not sure bud because i don't know what is the full question?
Step-by-step explanation:
A rectangular pyramid has a volume of 480 in. If a rectangular prism has a base and height congruent to the pyramid, what
is the volume of the prism? († point)
Please help!!!
After considering all the given data we come to the conclusion that the volume of the prism is 1440 in³, under the condition that A rectangular pyramid has a volume of 480 in.
The volume of a rectangular pyramid is represented by the formula
(1/3) × base area × height.
Now, the volume of a rectangular prism is given by the formula
base area × height.
Now if we consider the rectangular prism has a base and height congruent to the pyramid, then the base area of the prism is equivalent to the base area of the pyramid. Then, the volume of the prism is equivalent to three times that of the pyramid.
Hence, the volume of the pyramid is 480 in³, we can evaluate the volume of the prism
Volume of prism = 3 × Volume of pyramid
= 3 × (1/3) × Base area × Height
= Base area × Height
Then, the volume of the rectangular prism is
480 × 3
= 1440 in³.
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Ricky has 23 hours each week to dedicate to his classes. homework takes 6.5 hours and each class (c) is 1.5 hours long. how many classes does ricky take? which equation models the question? explain your thinking.
a) 23=6.5-1.5c b) 23=6.5+1.5c
c) 23=1.5+6.5c d) 23=1.5-6.5c
by dividing both sides by 1.5.
How many classes does Ricky take?To solve the problem, we need to first determine the total amount of time Ricky spends in his classes. We know that each class is 1.5 hours long, so if he takes c classes, then he will spend a total of 1.5c hours on class time. In addition, we know that he spends 6.5 hours on homework. Therefore, the total amount of time Ricky spends on his classes and homework is:
Total time = Class time + Homework time
Total time = 1.5c + 6.5
We also know that Ricky has 23 hours per week to dedicate to his classes and homework. Therefore, we can set up the following equation:
Total time = 23
Substituting the expression for a total time from the first equation, we get:
1.5c + 6.5 = 23
Now we can solve for c:
1.5c = 23 - 6.5
1.5c = 16.5
c = 11
Therefore, Ricky takes 11 classes.
The equation that models the question is b) 23=6.5+1.5c. This equation correctly represents the total time Ricky spends on his classes and homework (23 hours), as well as the time he spends on homework (6.5 hours) and the time he spends in class (1.5c hours).
by dividing both sides by 1.5.
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Many hotel chains that offer free wi-fi service to their customers have experienced increasing demand for internet bandwidth and increasing costs. marriott international would like to test the hypothesis that the proportion of customers that are carrying two wi-fi devices exceeds 0.60. a random sample of 120 marriott customers found that 78 have two wi-fi devices. marriott international would like to set î± = 0.01. the p-value for this hypothesis test would be ________.
The p-value for this hypothesis test is approximately 0.1317.
To calculate the p-value for the hypothesis test, we need to perform a one-sample proportion test using the sample data provided.
Let's define the null and alternative hypotheses:
Null hypothesis (H₀): The proportion of Marriott customers carrying two Wi-Fi devices is equal to or less than 0.60.
Alternative hypothesis (H₁): The proportion of Marriott customers carrying two Wi-Fi devices exceeds 0.60.
Sample size (n) = 120
Number of customers with two Wi-Fi devices (x) = 78
To test the hypothesis, we can use the normal approximation to the binomial distribution since the sample size is reasonably large.
First, calculate the sample proportion:
[tex]\hat{p}[/tex] = x / n = 78 / 120 = 0.65
Next, calculate the test statistic (z-score):
z = [tex]\frac{\hat{p}-p_0}{\sqrt{\frac{p_0(1-p_0)}{n} } }[/tex]
= (0.65 - 0.60) / √((0.60 * (1 - 0.60)) / 120)
= 0.05 / √(0.24 / 120)
= 1.1180
Now, we can find the p-value corresponding to the calculated test statistic using a standard normal distribution table or a statistical calculator.
In this case, the p-value for a one-sided test (since we are testing if the proportion exceeds 0.60) is approximately 0.1317.
Therefore, the p-value for this hypothesis test is approximately 0.1317.
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In the diagram of circle A shown below , chords CD snd EF intersect at G, and chords CE and FD and drawn
Which statements is not always true?
The incorrect statement about the intersecting triangles is A. CG ≅ FG.
Why is the statement CG ≅ FG incorrect about the intersecting triangles?With intersecting triangles, it is not always guaranteed that segments like CG and FG will be congruent. The lengths of CG and FG will depend on the specific configuration of the chords and their intersection point G.
However, CE/EG = FD/DG statement is TRUE. This is a consequence of the Intersecting Chords Theorem. When two chords intersect inside a circle, the products of their segments are equal.
Since ∠CEG ≅ ∠FDG intersect inside a circle, the corresponding intercepted arcs create equal angles at the intersection point. Therefore the statement is true.
ΔCEG ~ ΔFDG is also true because we know that the triangles share an angle and have proportional sides.
The answer above is in response to the full question below;
In the diagram of circle A shown below , chords CD and EF intersect at G, and chords CE and FD and drawn
Which statements is not always true?
a. CG ≅ FG
b. CE/EG = FD/ DG
c. ∠CEG ≅ FDG
d. ΔCEG ~ ΔFDG
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Which statement is true about the streets? Select all that apply. A. First Street intersects with Second Street and Third Street. B. Second Street is perpendicular to Third Street. C. First Street and Third Street are parallel. D. Second Street and Third Street are parallel. E. First Street is perpendicular to Second Street and Third Street. 6 /
The correct options are: A and D
Streets 2 and 3 are parallel and Street 1 is intersecting it
What is a Parallel Line and Intersections?Parallel lines are two or more straight lines that continue indefinitely without ever crossing each other, despite their extended lengths. They have an equal inclination and remain the same distance apart at all times. Consequently, intersections will never occur between them.
On the contrary, if non-parallel lines exist, they intersect to create one point, famously known as the 'point of intersection'. This specific point supplies the solution to the system of equations formed by the two lines.
Hence, we can see from the given image that Streets 2 and 3 are parallel and Street 1 is intersecting it
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Town Hall is located 4. 3 miles directly east of the middle school. The fire station is located 1. 7 miles directly north of Town Hall.
Part A
What is the length of a straight line between the school and the fire station? Round to the nearest tenth. Enter your answer in the box.
Part B
The hospital is 3. 1 miles west of the fire station. What is the length of a straight line between the school and the hospital? Round to the nearest
tenth. Enter your answer in the box.
Using Pythagorean theorem the distance between the school and the fire station is approximately 4.7 miles, while the distance between the school and the hospital is approximately 7.8 miles.
To solve this problem, we can use the Pythagorean theorem to find the distances and then add them up to get the total distance between the school and the fire station, and then between the school and the hospital.
Part A:
Let's call the middle school point A, Town Hall point B, and the fire station point C. We can draw a right triangle with AB as the base, BC as the height, and AC as the hypotenuse. Using the Pythagorean theorem, we have:
AC^2 = AB^2 + BC^2
AC^2 = 4.3^2 + 1.7^2
AC^2 = 18.98 + 2.89
AC^2 = 21.87
AC ≈ 4.7 miles (rounded to the nearest tenth)
Therefore, the length of the straight line between the school and the fire station is approximately 4.7 miles.
Part B:
Let's call the hospital point D. We can draw another right triangle with CD as the base, BC as the height, and BD as the hypotenuse. Using the Pythagorean theorem, we have:
BD^2 = BC^2 + CD^2
BD^2 = 1.7^2 + 3.1^2
BD^2 = 2.89 + 9.61
BD^2 = 12.5
BD ≈ 3.5 miles (rounded to the nearest tenth)
Now, we can add the distance between A and B (4.3 miles) to the distance between B and D (3.5 miles) to get the total distance between A and D:
AD ≈ 7.8 miles (rounded to the nearest tenth)
Therefore, the length of the straight line between the school and the hospital is approximately 7.8 miles.
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Express this number in scientific notation.
9 ten thousandths
Answer: 9 x 10^4
Step-by-step explanation:
9 ten thousands in standard form is written like this: 90,000
To convert this into scientific notation, we simply count how many spaces we want to move the decimal point.
So far, our number looks like this with a decimal point: 90000.0
To make this number equal to 9, we have to move the decimal point 4 spaces to the left.
The 4 then becomes our exponent.
So now we have 9 by itself, and all we do is multiply it by 10 with an exponent of 4, to show you are multiplying 10 four times.
Therefore, 9 ten thousands written in scientific notation is 9 x 10^4
Almost all employees working for financial companies in New York City receive large bonuses at the end of the year. A sample of employees selected from financial companies in New York City showed that they received an average bonus of last year with a standard deviation of. Construct a confidence interval for the average bonus that all employees working for financial companies in New York City received last year.
Round your answers to cents.
$________ to _______ $
To construct a confidence interval for the average bonus that all employees working for financial companies in New York City received last year, we need to know the sample size and the level of confidence. Without this information, we cannot calculate the confidence interval. Please provide the sample size and the level of confidence to proceed with the solution.
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A freezer chest is in the shape of a rectangular prism. Measured on the inside, the chest is 4 feet wide, 2. 5 feet tall, and 2 feet long. How much space is inside to hold frozen foods?
The freezer chest has 20 cubic feet of space inside to hold frozen foods.
To find the amount of space inside the freezer chest, we need to calculate its volume. The formula for the volume of a rectangular prism is V = lwh, where l is the length, w is the width, and h is the height.
Using the measurements given, we can plug them into the formula and calculate:
V = 4 ft x 2.5 ft x 2 ft
V = 20 cubic feet
Therefore, there is 20 cubic feet of space inside the freezer chest to hold frozen foods.
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Find the length of PQ.
Assume that lines which appear tangent are tangent.
Applying the secant-tangent theorem, the length of PQ is calculated as: 6 units.
How to Find the Length Using the Secant-Tangent Theorem?In the image given, line segment QS is a secant while QP is a tangent. This, according to the secant-tangent theorem, we have:
(x - 3)(x - 3 + 5) = (x - 1)²
(x - 3)(x + 2) = (x - 1)(x - 1)
Expand:
x² - x - 6 = x² - 2x + 1
Combine like terms:
x² - x² - x + 2x = 6 + 1
x = 7
length of PQ = x - 1
Plug in the value of x:
length of PQ = 7 - 1 = 6 units.
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If TQ=8, what is the circumference of the circle?
The circumference of the given circle with TQ = 8 units is given by approximately 50.26 units.
We know that the formula for the circumference of a circle with radius of 'r' units is given by,
P = 2πr
Here in the given figure we can see that the length TQ is a radius for the given circle with center at point Q.
Given the value of TQ = 8 units.
So, radius = 8 units.
So the circumference of the circle is given by
= 2πr
= 2π*8
= 16π
= 50.26 units [taking π = 3.14 and approximating the value to the two decimal places]
Hence the circumference of circle is 50.26 units approximately.
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Stacy and clinton are setting up the community center for a freshman orientation. they set up 8 rectangular tables with 6 chairs each and 5 round tables with 4 chairs each. the chairs are randomly numbered starting with 1 and the freshman will be randomly assigned a seat number.
what is the probability that the first freshman to arrive will be seated at a round table?
a 1/20
b 12/17
c 5/17
d 5/13
"The probability that the first freshman to arrive will be seated at a round table is (5/13)."
To calculate the probability, we need to determine the total number of seats and the number of seats at round tables.
There are 8 rectangular tables with 6 chairs each, so the total number of seats at rectangular tables is 8 * 6 = 48.
There are 5 round tables with 4 chairs each, so the total number of seats at round tables is 5 * 4 = 20.
The total number of seats in the community center is 48 + 20 = 68.
The probability of the first freshman being seated at a round table is the number of seats at round tables (20) divided by the total number of seats (68), which gives us 20/68 = 5/17.
Therefore, the correct answer is option C: 5/17.
In conclusion, the probability that the first freshman to arrive will be seated at a round table is 5/17. This is obtained by dividing the number of seats at round tables by the total number of seats in the community center.
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Quadratic function f has vertex (4, 15) and passes through the point (1, 20). Which equation represents f ?
A) f(x)= -5/9(x-4)^2+15
B) f(x)= 5/9(x-4)^2+15
C) f(x)= -35/9(x-4)^2-15
D) f(x)= 35/9(x-4)^2-15
Since quadratic function f has vertex (4, 15) and passes through the point (1, 20), an equation that represents f is: B. f(x) = 5/9(x - 4)² + 15.
How to determine the factored form of a quadratic equation?In Mathematics, the vertex form of a quadratic function is represented by the following mathematical equation:
f(x) = a(x - h)² + k
Where:
h and k represents the vertex of the graph.a represents the leading coefficient.Based on the information provided above, we can determine the value of a as follows:
f(x) = a(x - h)² + k
20 = a(1 - 4)² + 15
20 = 9a + 15
a = 5/9
Therefore, the required quadratic function is given by:
f(x) = a(x - h)² + k
f(x) = y = 5/9(x - 4)² + 15
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A favorite activity at LNHS is throwing paper
balls into the trashcan while the teacher isn't
looking. Suppose a paper ball is shot from 5 feet
off the ground, and the paper ball reaches a
height of 10 feet after 3 seconds.
*Write the equation that models the height (h)
of the paper ball at any given second (t).
Help me!!
The equation that models the height (h) of the paper ball at any given second (t) is: [tex]h = -16t^2 + 49.67t + 5.[/tex]
To write the equation that models the height (h) of the paper ball at any given second (t), we can use the formula:
[tex]h = -16t^2 + vt + s[/tex]
where v is the initial velocity (in feet per second), s is the initial height (in feet), and t is the time (in seconds).
In this case, we know that the paper ball was shot from 5 feet off the ground, so s = 5. We also know that the paper ball reached a height of 10 feet after 3 seconds, so we can use this information to find the initial velocity:
[tex]h = -16t^2 + vt + s[/tex]
[tex]10 = -16(3)^2 + v(3) + 5[/tex]
10 = -144 + 3v + 5
149 = 3v
v = 49.67 (rounded to two decimal places)
Now we can substitute the values for v and s into the equation:
[tex]h = -16t^2 + vt + s\\h = -16t^2 + 49.67t + 5[/tex]
Therefore, the equation that models the height (h) of the paper ball at any given second (t) is:
[tex]h = -16t^2 + 49.67t + 5.[/tex]
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I need help with this one
solve for x
Answer:
x = 2
Step-by-step explanation:
A secant is a straight line that intersects a circle at two points.
A segment is part of a line that connects two points.
According to the Intersecting Secants Theorem, the product of the measures of one secant segment and its external part is equal to the product of the measures of the other secant segment and its external part.
The given diagram shows two secant segments that intersect at an exterior point.
One secant segment is (6x - 1 + 7) and its external part is 7.The other secant segment is (x + 3 + 9) and its external part is 9.Therefore, according to the Intersecting Secants Theorem:
[tex](6x-1+7) \cdot 7=(x+3+9) \cdot 9[/tex]
Solve for x:
[tex]\begin{aligned}(6x+6) \cdot 7&=(x+12) \cdot 9 \\42x+42&=9x+108\\42x+42-9x&=9x+108-9x\\33x+42&=108\\33x+42-42&=108-42\\33x&=66\\33x\div33&=66\div33\\x&=2 \end{aligned}[/tex]
Therefore, the value of x is x = 2.
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The base of a solid is the region in the first quadrant between the graph of y=2x
and the x-axis for 0≤x≤1. For the solid, each cross section perpendicular to the x-axis is a quarter circle with the corresponding circle’s center on the x-axis and one radius in the xy-plane. What is the volume of the solid?
The volume of the solid is A. [tex]\pi/3[/tex]
What is the volume of a solid?The volume of a solid in geometry signifies the space it occupies inside a three-dimensional area. It denotes how much content can fill up its inner region, and as usual, measured in units like cubic feet, meters, or centimeters.
Finding the measurement formula varies from shape to shape but commonly involves multiplying width, height, and length. Given that many sectors rely on this term, such as engineering, architecture, and physics, understanding the concept of the volume of a solid weighs significantly.
If we take a cross-section of (x,y)perpendicular to the x-axis, with width dx, now the cross-section is a quarter circle with radius y.
Thus, the volume of the cross-section, since y = 2x becomes: [tex]\pi x^2 dx[/tex]
Now, the volume of the solid when integrated becomes: [tex]\frac{\pi }{3}[/tex]
Option A is correct.
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Express the negation of each of these statements in terms of quantifiers without using the negation symbol.
a) ∀x(x > 1)
b) ∀x(x ≤ 2)
c) ∃x(x ≥ 4)
d) ∃x(x < 0)
e) ∀x((x < −1) ∨ (x > 2))
f ) ∃x((x < 4) ∨ (x > 7))
The negation of each of these statements in terms of quantifiers without using the negation symbo
a) There exists at least one x such that x is not greater than 1.
b) There exists at least one x such that x is not less than or equal to 2.
c) For all x, x is less than 4.
d) For all x, x is greater than or equal to 0.
e) There exists at least one x such that either x is not less than or equal to -1 or x is not greater than 2.
f) For all x, x is not less than 4 and x is not greater than 7.
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If the cos= and tan 0 = 1/32,
what is sin 0?
13
The calculated value of sin of the angle is 1/96
Calculating the value of sin of the angleFrom the question, we have the following parameters that can be used in our computation:
cos(θ) = 1/3
tan(θ) = 1/32
The value of sin of the angle is calculated as
sin(θ) = cos(θ) * tan(θ)
substitute the known values in the above equation, so, we have the following representation
sin(θ) = 1/3 * 1/32
Evaluate the products
so, we have the following representation
sin(θ) = 1/96
Hence, the value of sin of the angle is 1/96
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Please hurry I need it ASAP
The value of x is 16.
Given,
The m line is parallel with the n line.
We need to find the value of x.
What are the relationships between parallel lines and angles?If two lines are parallel the corresponding angles are congruent.
Example:
[tex]\sf D[/tex] /
/
[tex]\sf A[/tex]<----------------[tex]\sf F[/tex]/----------------------->[tex]\sf B[/tex]
/
[tex]\sf C[/tex] <-----------[tex]\sf M[/tex]/------------------------------>[tex]\sf D[/tex]
/
[tex]\sf E[/tex] /
[tex]\sf AFD = CMF[/tex]
[tex]\sf AFM = CME[/tex]
From the figure, we see that
[tex]\sf 8x + 5 + 4x - 17 = 180[/tex]
[tex]\sf 12x - 12 = 180[/tex]
[tex]\sf 12x = 180 + 12[/tex]
[tex]\sf 12x = 192[/tex]
[tex]\sf x = \dfrac{192}{12}[/tex]
[tex]\sf x = 16[/tex]
Thus the value of x is 16.
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