Answer:
Step-by-step explanation:
1) [tex]6x^4 \times 6x^4 = 36x^8[/tex] (needs to be [tex]36x^{16}[/tex] )
2) [tex](4y^2) \times (4y^2) =16y^4[/tex] (needs to be [tex]25y^4[/tex] )
1) Change both [tex]6x^4 \text{ terms to } 6x^8.[/tex]
2) Change both [tex]4x^2 \text{ terms to } 5y^2.[/tex]
Bonus:
Need to change a minus to a plus,
[tex]36x^{16}-25y^4=(6x^8+5y^2)(6x^8-5y^2)[/tex]
how many 3-digit numbers can be formed using the digits 0, 1, 2, 3, 4, 5, 6, if repetition of digits is not allowed?
There are 35 different 3-digit numbers that can be formed using the digits 0, 1, 2, 3, 4, 5, 6, if the repetition of digits is not allowed.
What is probability?Probability is a branch of mathematics that deals with the study of randomness and uncertainty in events. It is the measure of the likelihood or chance that an event will occur. Probability is expressed as a number between 0 and 1, where 0 indicates that the event will not occur and 1 indicates that the event will occur with certainty.
According to the given information :To form a 3-digit number using the given set of 7 digits (0, 1, 2, 3, 4, 5, 6) without repetition, we need to choose 3 different digits from the set.
We can count the number of ways to select 3 distinct digits from the set of 7 using the combination formula, which is:
C(n, k) = n! / (k! * (n-k)!)
Where n is the total number of items in the set, and k is the number of items we want to choose.
In this case, n = 7 (because we have 7 digits to choose from), and k = 3 (because we want to choose 3 digits to form a 3-digit number).
Therefore, the number of ways to select 3 distinct digits from the set of 7 is:
C(7, 3) = 7! / (3! * 4!)
= (7 * 6 * 5 * 4 * 3 * 2 * 1) / ((3 * 2 * 1) * (4 * 3 * 2 * 1))
= (7 * 6 * 5) / (3 * 2 * 1)
= 35
Therefore, there are 35 different 3-digit numbers that can be formed using the digits 0, 1, 2, 3, 4, 5, 6, if the repetition of digits is not allowed.
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a cable tv receiving dish is in the shape of a paraboloid of revolution. find the location of the receiver, which is placed at the focus, if the dish is 6 feet across at its opening and 2 feet deep.
the receiver is located at (0, 0, 2.25 feet) or (0, 0, 27 inches).To find the location of the receiver, we first need to determine the equation of the paraboloid.
The standard equation for a paraboloid of revolution with a vertical axis is:
z = [tex](x^2 + y^2)[/tex]/(4f)
Where:
z is the height at any point (x, y) on the paraboloid.
x and y are the horizontal coordinates of the point.
f is the focal length of the paraboloid, which is half the depth of the dish.
In this case, the dish is 6 feet across at its opening, so the diameter is 6 feet and the radius is 3 feet. Therefore, the maximum value of x and y is 3 feet. The depth of the dish is given as 2 feet.
Using these values, we can solve for the focal length:
2 = [tex](3^2 + 3^2)[/tex]/(4f)
2 = 18/(4f)
f = 18/8 = 9/4 = 2.25 feet
Now that we have the value of f, we can find the location of the receiver, which is placed at the focus of the paraboloid. The focus is located at (0, 0, f).
Therefore, the receiver is located at (0, 0, 2.25 feet) or (0, 0, 27 inches).
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. Gary's father dropped him off at
soccer practice at 2:45 P.M.
His mother picked him up at 16
4:00 P.M. How long did soccer
practice last?
Answer:
1 hours and 55 minute?
Step-by-step explanation:
a children's liquid medicine contains 100 mg of the active ingredient in 5 ml . if a child should receive 300 mg of the active ingredient, how many milliliters of the medicine should the child be given? for the purposes of this question, assume that these numbers are exact.
The child should be given 15 ml of the medicine to receive 300 mg of the active ingredient.
The given problem requires us to determine the number of milliliters of a liquid medicine that a child should receive in order to obtain a specific dosage of the active ingredient. We are given that the medicine contains 100 mg of the active ingredient in 5 ml.
The child needs to receive 300 mg of the active ingredient, and there are 100 mg of the active ingredient in 5 ml of the medicine. Therefore, the child should be given:
[tex]\frac{300 mg}{100mg/5ml} = \frac{300\text{ mg} \times 5\text{ ml}}{100\text{ mg}} = 15\text{ ml}$$[/tex]
So the child should be given 15 ml of the medicine to receive 300 mg of the active ingredient.
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Polygon B is a scaled copy of Polygon A using scale factor of 5. How many time as lagre is the area of Polygon B compared to the area of Polygon A?
Cady stamped 250 envelopes in 10 minutes . How many envelopes per minute did she stamp?
Answer:
25 Per Minute
Step-by-step explanation:
25 X 10 = 250
Hope This Helps! ^^
25 per minute
So if she stamped 250 envelopes in 10 minutes, we have to divide 250 by 10, which equals to 25!
A rectangle has an area of (24x + 30) square units. Select all of
the dimensions that are possible for this rectangle.
width 6 units; length (4x + 5) units
width 4 units; length (6x + 7) units
width 3 units; length (21x + 27) units
width 8 units; length (3x + 4) units
width 2 units; length (15 + 12x) units
Answer:
We can check which dimensions are possible for the rectangle by finding the product of the width and length and seeing if it equals the given area of (24x + 30) square units.
Let's check each option:
width 6 units; length (4x + 5) units
Area = 6(4x + 5) = 24x + 30
This option is possible.
width 4 units; length (6x + 7) units
Area = 4(6x + 7) = 24x + 28
This option is not possible since the area is not equal to (24x + 30).
width 3 units; length (21x + 27) units
Area = 3(21x + 27) = 63x + 81
This option is not possible since the area is not equal to (24x + 30).
width 8 units; length (3x + 4) units
Area = 8(3x + 4) = 24x + 32
This option is not possible since the area is not equal to (24x + 30).
width 2 units; length (15 + 12x) units
Area = 2(15 + 12x) = 30 + 24x
This option is not possible since the area is not equal to (24x + 30).
Therefore, the only possible dimension for the rectangle is width 6 units and length (4x + 5) units.
To make balloon animals at birthday parties, Ani charges $3 for each balloon animal plus $8 to cover travel costs. If she made $53 at a party, how many balloon animals did she make?
Without the travelling cost being $8, Ani made a total of $45 and she made 15 animal balloons.
We know that the total cost Ani charges for travelling is $53
and the total amount Ani made at the party = $53
therefore, first to find the number of balloons she made we need to subtract the travelling cost from the total amount she made:
= 53 - 8 = 45
therefore, now we know that Ani made a total amount $45 from balloons alone:
also, we know that each balloon costs $3 each therefore we need to divide $45 by 3, we get 15,
hence, we can say that Ani made a total of 15 animal balloons for the party.
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a solid metal prism has a rectangular base with sides of 4 inches and a height of 6 inches. a hole in the shape of a cylinder, with a radius of 1 inch, is drilled through the entire length of the rectangular prism.
What is the approximate volume of the remaining solid, in cubic inches?
a. 19 cubic inches b. 77 cubic inches c. 96 cubic inches d. 93 cubic inches
The approximate volume of the remaining solid is option (b) 77 cubic inches
The volume of the rectangular prism is given by
V_rectangular prism = base area x height = 4 x 4 x 6 = 96 cubic inches
The volume of the cylinder is given by
V_cylinder = π x r^2 x h = π x 1^2 x 6 = 6π cubic inches
To find the volume of the remaining solid, we need to subtract the volume of the cylinder from the volume of the rectangular prism
V_remaining solid = V_rectangular prism - V_cylinder = 96 - 6π ≈ 77 cubic inches (rounded to the nearest whole number)
Therefore, the correct option is (b) 77 cubic inches
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Construct a triangle that has one angle measuring 30 deg and another measuring 110°. How many possible triangles can you draw?
There is only one possible triangle that can be drawn with one angle measuring 30 deg and another measuring 110°. This is because all triangles have a sum of 180° for the three angles.
What is triangle ?Triangle is a three-sided polygon with three straight sides that intersect at three vertices. It is one of the basic shapes in geometry, and is considered to be a building block of other shapes. Triangles can be classified according to their sides, angles, and area. The most common types of triangles are equilateral, isosceles, and scalene triangles, which are classified according to the length of their sides. Triangles can also be classified according to their angles, as acute, right, and obtuse triangles, which are classified according to the size of their angles. Additionally, the area of a triangle is determined by its base, height, and side lengths.
Therefore if one angle is 30° and the other is 110°, the third angle must be 40° for the triangle to be valid.
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False. For two triangles to be similar, the angles must be equal. The angles of the two triangles given do not match, so the triangles are not similar.
What is angle?An angle is a geometrical figure that is formed by two lines or rays that have a common endpoint. It is a measure of the amount of turn between the two lines or rays. Angles are typically measured in degrees, with a full angle measuring 360 degrees. Angles can also be measured in radians, with a full angle measuring 2π radians. Angles are used in math and science to describe position and orientation. Common examples of angles include right angles, acute angles, obtuse angles, and straight angles. Angles can be used to calculate the area of polygons, measure the slope of a line, and determine the force of friction.
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Complete Question:
A triangle has angles that measure 45° and 65°. A second triangle has angles that measure 110° and 30°. These two triangles are similar. O True O False
An airplane is 5,000 ft above ground and has to land on a runway that is 7,000 ft away as shown above. Let x be the angle the pilot takes to land the airplane at the beginning of the runway. Which equation is a correct way to calculate x?
The fourth equation which is tan x = [tex]\frac{7000}{5000}[/tex] is the correct way to calculate x. This has been obtained by using trigonometry.
What is trigonometry?
Trigonometry is the study of right-angled triangles, which includes the sides, angles, and connections of each triangle.
We are given that the airplane is 5,000 ft above ground and has to land on a runway that is 7,000 ft away with an angle x.
Since, we are not given the hypotenuse so, we will use tan θ.
We know that in trigonometry, tan θ is calculated as the ratio of the opposite side to the adjacent side.
So,
tan x = [tex]\frac{7000}{5000}[/tex]
Hence, the fourth equation is the correct answer.
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The complete question has been attached below
The graphs below have the same shape. What is the equation of the red
graph?
f(x) = 4 – x²
g(x) = ?
O A. g(x) = (7 - x)2
O B. g(x) = 1 - x2
O C. g(x) = 7 - x2
D. g(x) = (1 - x)2
Answer:
C
Step-by-step explanation:
The red graph is obtained by shifting the graph of f(x) = 4 - x² upwards by some amount. We can see that the highest point on the red graph occurs at x = 0, where the value is 4.
To shift the graph of f(x) upwards by 3 units, we can add 3 to the entire function:
f(x) + 3 = 4 - x² + 3
= 7 - x²
So the equation of the red graph is:
g(x) = 7 - x²
Therefore, the correct answer is option C: g(x) = 7 - x².
is tderiv one-to-one? explain the significance of this result in terms of the derivative on polynomials.
The total derivative of a function is not necessarily one-to-one. The total derivative represents the change in a function with respect to all of its input variables.
If a function has multiple input variables, the total derivative is a matrix, called the Jacobian matrix, whose entries represent the partial derivatives of the function with respect to each input variable.
A function with a non-invertible Jacobian matrix is not one-to-one, since multiple input values can result in the same output value. For example, consider the function f(x,y) = (x^2, y^2). The total derivative of f is given by the Jacobian matrix:
| 2x 0 |
| 0 2y|
This matrix is non-invertible when x=0 or y=0, since it has a determinant of zero. Thus, the function f is not one-to-one when x=0 or y=0.
In terms of polynomials, the total derivative is important for determining whether a polynomial has multiple roots. A root of a polynomial is a value of the input variable that causes the polynomial to equal zero. If a polynomial has multiple roots, it is not one-to-one, since different input values can result in the same output value.
The total derivative of a polynomial can be computed using the power rule of differentiation. For example, consider the polynomial p(x) = x^3 - 6x^2 + 11x - 6. The total derivative of p with respect to x is:
p'(x) = 3x^2 - 12x + 11
If p'(x) has multiple roots, then p(x) has multiple roots as well. In this case, p'(x) has roots at x=1 and x=11/3, so p(x) has multiple roots at x=1 and x=3. Thus, the total derivative is useful for identifying when a polynomial is not one-to-one.
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Is total derivative is one-to-one? explain the significance of this result in terms of the derivative on polynomials.
cubic feet. The box has a length of
(x + 8) feet, a width of x feet, and a height of (x − 2) feet. Find the dimensions of the box.
Answer:
Step-by-step explanation:
To find the dimensions of the box, we need to solve for the value of x in the expressions given for its length, width, and height.
The volume of a box is given by multiplying its length, width, and height, so we can write:
V = (x+8) * x * (x-2)
Expanding the expression, we get:
V = (x^3 + 6x^2 - 16x)
We know that the volume of the box is measured in cubic feet, so we can assume that V is a positive value. Therefore, we can set V equal to some positive number, such as 1000 or 2000, and solve for x using algebraic techniques such as factoring or the quadratic formula.
For example, if we set V = 1000, we can write:
1000 = x^3 + 6x^2 - 16x
Simplifying and rearranging the terms, we get:
x^3 + 6x^2 - 16x - 1000 = 0
Using a graphing calculator or other mathematical software, we can find that the real solution to this equation is approximately x = 10.5.
Therefore, the dimensions of the box are:
- Length: x+8 = 18.5 feet
- Width: x = 10.5 feet
- Height: x-2 = 8.5 feet
which distribution is described by predicting the number of girls amoung 5 children randomly selected from a group of 10 girls and 10 boys
The distribution described is a binomial distribution.
A binomial distribution describes a discrete probability distribution, which means the values are countable. This distribution has two possible outcomes, in this case, either a girl or a boy. The probability of getting a girl is 0.5, as there are 10 girls and 10 boys in the group.
The binomial distribution is described by the following formula: P(x) = nCx * p^x * (1-p)^n-x, where n is the number of trials, x is the number of successes, and p is the probability of success in each trial.
In this case, n=5, x= number of girls, and p=0.5. Thus, P(x)= 5Cx * 0.5^x * 0.5^5-x. To predict the number of girls among 5 randomly selected children from the group, we need to calculate P(x) for x=0,1,2,3,4, and 5. This will give us the probabilities of selecting 0, 1, 2, 3, 4, and 5 girls in the group.
The sum of all these probabilities should be equal to 1, indicating that all the possibilities have been accounted for. This binomial distribution will help us predict the number of girls among 5 randomly selected children from the group of 10 girls and 10 boys.
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WHat is 9. 30 x 6. 6 I cant seem to get it
Answer:
61.38
Step-by-step explanation:
9.30×6.6=61.38
btw u could've used a calculator
at 95% confidence, how large a sample should be taken to obtain a margin of error of 0.04 for the estimation of a population proportion? assume that past data are not available for developing a planning value for p*. (round your answer up to the nearest whole number.)
A sample size of at least 61 should be taken to obtain a margin of error of 0.04 for the estimation of a population proportion at a 95% confidence level.
Given data:
To determine the sample size required for estimating a population proportion with a given margin of error at a 95% confidence level, you can use the following formula:
[tex]n=\frac{Z^2 \cdot p(1-p)}{E^2}[/tex]
n is the required sample size.
Z is the Z-score corresponding to the desired confidence level. For a 95% confidence level, the Z-score is approximately 1.96.
p is an estimate of the population proportion (since you don't have prior data, you can use p =0.5 for maximum variability, which results in the largest sample size requirement).
E is the desired margin of error, which is 0.04 in this case.
Substitute the values into the formula:
[tex]n=\frac{1.96^2*0.5^2}{0.04^2}[/tex]
The value of n = 60.26
Since the sample size is a whole number, n = 61
Hence, a sample size of at least 61 should be taken for the estimation of a population proportion at a 95% confidence level.
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a line that passes through (3,5) and (4,13)
Answer:
y = 8x-19
Step-by-step explanation:
The first step is to find the slope.
m= ( y2-y1)/(x2-x1)
= ( 13-5)/(4-3)
= 8/1
= 8
Then we can use the slope intercept formula.
y = mx+b
y = 8x+b
Substitute a point to find the intercept.
5 = 8*3+b
5 = 24+b
-19 = b
The formula is
y = 8x-19
Answer:
y = 8x - 19
Step-by-step explanation:
the equation of a line in slope- intercept form is
y = mx + c ( m is the slope and c the y- intercept )
calculate m using the slope formula
m = [tex]\frac{y_{2}-y_{1} }{x_{2}-x_{1} }[/tex]
with (x₁, y₁ ) = (3, 5 ) and (x₂, y₂ ) = (4, 13 )
m = [tex]\frac{13-5}{4-3}[/tex] = [tex]\frac{8}{1}[/tex] = 8 , then
y = 8x + c ← is the partial equation
to find c substitute either of the 2 points into the partial equation
using (3, 5 )
5 = 8(3) + c = 24 + c ( subtract 24 from both sides )
- 19 = c
y = 8x - 19 ← equation of line
a bridge hand consists of 13 cards from a deck of 52. find the probability that a bridge hand includes exactly 4 aces and exactly 3 kings.
The probability that a bridge hand includes 4 acres and exactly 3 kings is 0.028%
To find the probability of getting exactly 4 aces and 3 kings in a bridge hand, we can use the following formula:
P(4 aces and 3 kings) = (number of ways to get 4 aces and 3 kings) / (number of ways to select 13 cards from a deck of 52)
To calculate the numerator, we can first find the number of ways to choose 4 aces from the 4 available in the deck, and then the number of ways to choose 3 kings from the 4 available in the deck. The remaining 6 cards can be any of the 44 non-ace, non-king cards. Therefore:
Number of ways to get 4 aces and 3 kings = (4 choose 4) x (4 choose 3) x (44 choose 6) = 1 x 4 x 44,380,776 = 177,523,104
To calculate the denominator, we can find the total number of ways to choose any 13 cards from the 52-card deck:
Number of ways to select 13 cards from a deck of 52 = (52 choose 13) = 635,013,559,600
Therefore, the probability of getting exactly 4 aces and 3 kings in a bridge hand is:
P(4 aces and 3 kings) = (number of ways to get 4 aces and 3 kings) / (number of ways to select 13 cards from a deck of 52) = 177,523,104 / 635,013,559,600 = 0.0002799 or approximately 0.028%.
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find the next two terms 9.56,9.57,9.58,9,59
The next two terms in this arithmetic progression is 7.60 and 7.61.
What is arithmetic progression?An arithmetic prοgressiοn (AP) is a sequence where the differences between every twο cοnsecutive terms are the same. Fοr example, the sequence 2, 6, 10, 14, … is an arithmetic prοgressiοn (AP) because it fοllοws a pattern where each number is οbtained by adding 4 tο the previοus term. A real-life example οf an AP is the sequence fοrmed by the annual incοme οf an emplοyee whοse incοme increases by a fixed amοunt οf $5000 every year.
We know the Arithmetic progression formula:
[tex]\rm a_{n}=a_{1}+(n-1)d[/tex]
[tex]\rm a_n[/tex] = the nᵗʰ term in the sequence
[tex]\rm a_1[/tex] = the first term in the sequence
d = the common difference between terms
Here 4 terms are given
5th and 6th terms are to be found,
Thus,
a₁ = 9.56
d = (9.56 -9.57) = 0.01
n = 5
Then
5th term is :
aₙ = a₁ + (n - 1)d
aₙ = 9.56 + (5 - 1)0.01
aₙ = 9.56 + (4)0.01
aₙ = 9.56 + 0.04
aₙ = 7.60
6th term is :
aₙ = a₁ + (n - 1)d
aₙ = 9.56 + (6 - 1)0.01
aₙ = 9.56 + (6)0.01
aₙ = 9.56 + 0.05
aₙ = 7.61
Thus, The next two terms in this arithmetic progression is 7.60 and 7.61.
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a 35 foot ladder leans against the top of a building. the ladder's base is 9.7 feet from the building. find the angle of elevation between the ladder and the ground.
As a result, there is a about 74.53 degree elevation difference between the ladder and the ground.
what is angle ?A geometric shape known as an angle is created when two rays or line segments come together at a location known as the vertex. The sides of the angle are the rays or line segments. Angles are used to define the amount of rotation or inclination between two lines or planes and are commonly measured in degrees or radians. The most popular unit of measurement for angles is the degree, which is derived from the 360 equal divisions of a circle. Angles are measured in degrees using a protractor, and each component is referred to as a degree.
given
We may resolve this issue using trigonometric functions. The elevation angle between the ladder and the ground will be denoted by the symbol. Next, we have
opposite/hypotenuse of sin()
adjacent/hypotenuse = cos()
The building's height in this instance serves as the opposing side, and the length of the ladder serves as the hypotenuse. We thus have:
height/35 cos() = 9.7/35 sin()
By rearranging the first equation, we can find the height:
height equals 35*sin()
The second equation can then be changed to include the following expression:
cos(θ) = 9.7/35
cos(θ) = 0.2771
By taking the inverse cosine of both sides, we can now solve for :
θ = cos^(-1)(0.2771) (0.2771)
7.453 degrees
As a result, there is a about 74.53 degree elevation difference between the ladder and the ground.
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A miniature golf course recently provided a number of customers with golf balls, including 2 red golf balls and 6 other golf balls. Based on experimental probability, how many of the next 12 golf balls handed out should you expect to be red golf balls?
Answer:
1.5 or about 1 or 2 maybe
hope this helpd
write the number 150 as a sum of three numbers so that the sum of the products taken two at a time is a maximum. (enter the three numbers as a comma-separated list.)
The three numbers are 50, 50, and 50, which give a maximum sum of products taken two at a time of 5000.
To find the sum of three numbers whose product is maximum, we need to distribute the numbers as equally as possible. Therefore, we divide 150 by 3, giving 50. This means that the sum of the three numbers is 150, and their product is maximized.
To check that this is indeed the case, we can calculate the sum of the products taken two at a time: 50x50 + 50x50 + 50x50 = 5000, which is the maximum possible sum.
Therefore, the three numbers are 50, 50, and 50.
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The graph below was drawn with output on the vertical axis and input on the horizontal axis. What does
this graph indicate about the relationship between the input and the output?
The οutput axis is independent οf what the input is, as the slοpe is zerο in the graph.
What is graph?A graph is a structure made up οf a cοllectiοn οf things, where sοme οbject pairs are cοnceptually "cοnnected." The items are represented by mathematical abstractiοns knοwn as vertices, and each pair οf cοnnected vertices is referred tο as an edge.
Here the given :
The graph belοw was drawn with οutput οn the vertical axis and input οn the hοrizοntal axis,
⇒ Slοpe = 0 (can be seen frοm graph),
Frοm the graph, y = 4 is the graph's equatiοn, and the slοpe οf the graph is zerο. The result will always be the same, regardless οf the input. Because the οutput is unifοrm thrοughοut, the input dοesn't really care what happens tο it.
Therefοre, the οutput axis is independent οf what the input is, as the slοpe is zerο in the graph.
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Please help fast thankyou
Answer:
[tex]y = \frac{2}{7} x - \frac{20}{7} [/tex]
Step-by-step explanation:
[tex] - 2 = \frac{2}{7} (3) + b[/tex]
[tex] - \frac{14}{7} = \frac{6}{7} + b [/tex]
[tex]b = - \frac{20}{7} [/tex]
[tex] y = \frac{2}{7} x - \frac{20}{7} [/tex]
What are the lengths of EF
and FG
to the nearest tenth?
Answer:
EF = 6.49
FG = 3.96
Step-by-step explanation:
We can solve this problem using sine rule, sine rule states that in a triangle ABC, we have
[tex]\dfrac{BC}{\sin a} = \dfrac{AB}{\sin c} = \dfrac{AC}{\sin b}[/tex]
applying this to our question,
[tex]\dfrac{EG}{\sin 86} = \dfrac{FG}{\sin 39} = \dfrac{EF}{\sin 55}[/tex]
hence,
[tex]FG = \dfrac{EG \sin 39}{\sin 86}[/tex]
[tex]EF = \dfrac{EG \sin 55}{\sin 86}[/tex]
calculating we get,
FG = 3.96
EF = 6.49
Hopefully this answer helped you!!!
the probability that a randomly selected case will have a score beyond either +1.00 or -1.00 standard deviation of the mean is select one a 6826
b 5000 c 3174 d 1/2 of the area of 1 standard deviation
Correct option is (c) 3174
The probability that a randomly selected case will have a score beyond either +1.00 or -1.00 standard deviation of the mean depends on the type of distribution and the area under the curve beyond these values.
Assuming a normal distribution, approximately 68% of the cases fall within one standard deviation from the mean, and approximately 32% of the cases fall beyond either +1.00 or -1.00 standard deviation of the mean.
To calculate the probability of a randomly selected case falling beyond either +1.00 or -1.00 standard deviation of the mean, we need to calculate the area under the curve beyond these values. Since the distribution is symmetric, we can calculate the area on one side of the mean and multiply it by 2.
Using a standard normal distribution table or calculator, we can find the area under the curve beyond +1.00 standard deviation from the mean as 0.1587 and the area under the curve beyond -1.00 standard deviation from the mean as 0.1587.
Therefore, the total probability of a randomly selected case falling beyond either +1.00 or -1.00 standard deviation of the mean is 0.1587 + 0.1587 = 0.3174, which is approximately 32%.
Hence, the correct option is (c) 3174.
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please help!! this stuff is very confusing to me!
the combined area of the garden and the walkway when the width of the walkway is 4 feet is LW + 8L + 8W + 64 square feet.
why it is?
Let's assume that the length of the rectangular garden is L and the width is W. Let the width of the walkway be x.
a. The area of the rectangular garden is L x W. The combined area of the garden and the walkway is the area of the larger rectangle formed by the outer boundary of the walkway. The length of this larger rectangle is (L + 2x) and the width is (W + 2x). Therefore, the polynomial that represents the combined area of the garden and the walkway is:
(L + 2x)(W + 2x)
Expanding this expression, we get:
LW + 2Lx + 2Wx + 4x²2
So, the polynomial that represents the combined area of the garden and the walkway is LW + 2Lx + 2Wx + 4x²2.
b. If the width of the walkway is 4 feet, then x = 4. Substituting this value in the polynomial we obtained in part (a), we get:
LW + 2L(4) + 2W(4) + 4(4)²2
Simplifying this expression, we get:
LW + 8L + 8W + 64
Therefore, the combined area of the garden and the walkway when the width of the walkway is 4 feet is LW + 8L + 8W + 64 square feet.
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I’ll give brainstorm if you do it but I’m mad confused fr
Hope this helps! You just submitted the picture and never really showed which side was a b c or anything!
By the angle bisector theorem,
[tex]\frac{5}{9}=\frac{2}{x-2}[/tex]
After cross multiplying,
5(x-2) = 2(9)
5x-10 = 18
5x = 28
x = 5.6
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Answer:
Step-by-step explanation: