The number of monkeys when number of monkeys varies inversely to the number of clowns is 45.
What is inverse proportion:
Inverse proportion is a mathematical relationship between two variables, in which an increase in one variable causes a proportional decrease in the other variable, and a decrease in one variable causes a proportional increase in the other variable.
In other words, the two variables vary in such a way that their product remains constant.
Here we have
10 monkeys vary inversely when there are 18 clowns.
We can set up the inverse variation equation as:
=> monkey ∝ 1/clown
If k is the constant of proportionality.
=> Monkey (clown) = k
It is given that when there are 10 monkeys, there are 18 clowns, so we can write:
=> (10)(18) = k
Solving for k, we get:
k = (10 x 18) = 180
Now we can use this value of k to find the number of monkeys when there are 4 clowns:
=> monkey = k/clown = 180/4 = 45
Therefore,
The number of monkeys when number of monkeys varies inversely to the number of clowns is 45.
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which graph represents the linear equation y= 1/2 x + 2
Answer:
The graph on the top right
Step-by-step explanation:
The slope-intercept form is y = mx + b
m = the slope
b = y-intercept
The equation is y = 1/2x + 2
The y-intercept in this equation is 2, meaning the graph has a point (0,2) on it. Looking at the options, the only graph that has a point (0,2) is the map on the top right, and that is the answer.
Hillsdale Orchard grows Fuji apples and Gala apples. There are 160 Fuji apple trees and 120 Gala apple trees in the orchard.
Hillsdale Orchard's owners decide to plant 30 new Gala apple trees. Complete the ratio table (click for help) to find the number of new Fuji apple trees the owners should plant if they want to maintain the same ratio of Fuji apple trees to Gala apple trees
To maintain the same ratio of Fuji apple trees to Gala apple trees, the owners of Hillsdale Orchard should: plant 12 new Fuji apple trees when they plant 30 new Gala apple trees.
To find the number of new Fuji apple trees that the owners of Hillsdale Orchard should plant to maintain the same ratio of Fuji apple trees to Gala apple trees, we need to use a ratio table.
First, we need to determine the ratio of Fuji apple trees to Gala apple trees before the new trees are planted. Let's assume that there are currently 40 Fuji apple trees and 100 Gala apple trees. The ratio of Fuji apple trees to Gala apple trees is therefore 40:100, which can be simplified to 2:5.
Next, we need to use this ratio to determine the number of new Fuji apple trees that need to be planted. Since the owners are planting 30 new Gala apple trees, we can use the ratio of 2:5 to find the corresponding number of new Fuji apple trees.
To do this, we need to divide the number of new Gala apple trees by the denominator of the ratio (which represents the number of units of the ratio). In this case, the denominator is 5.
30 (new Gala apple trees) ÷ 5 (denominator) = 6
This means that for every 5 new Gala apple trees, the owners should plant 2 new Fuji apple trees. Therefore, the owners should plant 12 new Fuji apple trees (2 trees for every 5 new Gala apple trees, multiplied by the 30 new Gala apple trees being planted).
In summary, to maintain the same ratio of Fuji apple trees to Gala apple trees, the owners of Hillsdale Orchard should plant 12 new Fuji apple trees when they plant 30 new Gala apple trees.
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The owner of a meat market has an assistant who has determined that the weights of roasts are normally distributed, with a mean of 3.2 pounds and standard deviation of 0.8 pounds. for a sample of 25 roasts, what is the probability of sample mean less than 3.1 pounds
The probability of sample mean less than 3.1 pounds: 0.266. The correct option is C.
The weights of roasts are normally distributed with a mean of 3.2 pounds and a standard deviation of 0.8 pounds. In a sample of 25 roasts, we want to find the probability that the sample mean is less than 3.1 pounds.
First, we need to calculate the standard error of the mean, which is the standard deviation divided by the square root of the sample size:
Standard error = 0.8 / √25 = 0.8 / 5 = 0.16
Now, we need to calculate the z-score for the sample mean of 3.1 pounds:
Z = (Sample mean - Population mean) / Standard error = (3.1 - 3.2) / 0.16 = -0.1 / 0.16 = -0.625
Using a z-table or calculator, we find the probability associated with a z-score of -0.625:
P(Z < -0.625) ≈ 0.266
Therefore, the probability of the sample mean being less than 3.1 pounds is approximately 0.266, which corresponds to option C.
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Complete question:
The owner of a meat market has an assistant who has determined that the weights of roasts are normally distributed, with a mean of 3.2 pounds and a standard deviation of 0.8 pounds. For a sample of 25 roasts, what is the probability of sample mean less than 3.1 pounds?
a. 0.495
b. 0.450
c. 0.266
d. 0.521
How many hours is 1,000,00 minutes
Answer:
16.6666 hours.
Step-by-step explanation:
This conversion of 1,000 minutes to hours has been calculated by multiplying 1,000 minutes by 0.0166 and the result is 16.6666 hours.
Answer:
16,666.67 hours
Step-by-step explanation:
A minute is a unit of time equal to 60 seconds.
Question 2. Enter the correct answer in the box.
The given equation, a = v²/r, solved for r is:
r = v²/a
Subject of formulae: Solving the equation for rFrom the question, we are to solve the given equation for r
From the given information,
The given equation is
a = v²/r
To solve the equation for r means we should isolate the variable r
Solving the equation for r
a = v²/r
Multiply both sides of the equation by r
a × r = v²/r × r
ar = v²
Divide both sides of the equation by a
ar/a = v²/a
r = v²/a
Hence, the equation solved for r is:
r = v²/a
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How much money did Susan earn per hour
Answer:
$9.50
Step-by-step explanation:
Divide the total earnings by total hours.
Zelda has 8 rabbits with which to start an animal farm. If the rabbit population doubles each month, in how many months will the rabbit population be 5,800?
In a case whereby Zelda has 8 rabbits with which to start an animal farm. If the rabbit population doubles each month, the number of months that the rabbit population will be 5,800 is 9.5 months.
How can the the number of months?In order to calculatre the month then we can use the expression y = abⁿ
a = starting number ( 8 rabbits)
b = rate of change = (2)
n = number of months that we need to calculate
y = rabbit population = 5800
The we can substitute to have
5800 = 8 × 2ⁿ
5800 / 8 = 2ⁿ
725 = 2ⁿ
n = 9.5 months.
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Consider the isosceles trapezoid in the figure shown.
If PQ 6.5 cm and SR 12 cm, what is the value of x?
4cm
5.25cm
9.25cm
11.25cm
Answer:
(1/2)(6.5 + 12) = x + 4
(1/2)(18.5) = x + 4
9.25 = x + 4
x = 5.25 cm
Does this situation involve descriptive statistics or inferential statistics?
Out of 25 students in the class, 40% are male.
descriptive statistics
inferential statistics
Out of 25 students in the class, 40% are male is: Descriptive statistics.
Descriptive statistics is the process of summarizing and organizing data from a sample or population in order to provide an overview of the main characteristics. In this case, the data provided tells us that out of 25 students in the class, 40% are male.
This information is a summary of the gender distribution within this specific class, rather than making any predictions or generalizations about a larger population.
In contrast, inferential statistics is the process of using data from a sample to make predictions or draw conclusions about a larger population. If we were given data about a sample of classes and asked to estimate the proportion of male students in all classes, that would be an example of inferential statistics.
To summarize, the situation you provided, which states that out of 25 students in the class, 40% are male, is an example of descriptive statistics as it only provides a summary of the data for that specific class.
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1. If a 20 inch pizza costs $13, how many square inches of pizza do you
for 1 dollar? In other words, what is the unit rate per one dollar?
Answer:
I think you get 0.65 inches of pizza for 1 dollar
Step-by-step explanation:
$13 divided by 20 inches = 0.65
When viewed from a distance of 32 feet from its base the top of the flagpole can be seen from the ground at an angle of elevation of 39° what is the height of the flagpole
The height of the flagpole is approximately 23.7 feet.
We can use the tangent function to solve this problem. Let's call the height of the flagpole "h". From the ground, we have a right triangle with the flagpole height as the opposite side, the distance to the flagpole as the adjacent side, and the angle of elevation as the angle opposite the flagpole height.
Using the tangent function, we can write:
tan(39°) = h/32
Solving for h, we get:
h = 32 * tan(39°)
h ≈ 23.7 feet
Therefore, the height of the flagpole is approximately 23.7 feet when viewed from a distance of 32 feet at an angle of elevation of 39°.
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A triangle has angle measures of (x + 3)°, (5x – 8)°, and (2x + 1)°.
What is the measure of the smallest angle of the triangle in degrees?
A 47°
B 26°
C 107°
D 23°
Answer: B
Step-by-step explanation:
x + 3 + 5x - 8 + 2x + 1 = 180
8x - 4 = 180
8x = 184
x = 23
23 + 3 = 26, 5(23) - 8 = 107, 2(23) + 1 = 47
the smallest is 26
Intelligence Quotient (IQ) scores are often reported to be normally distributed with μ=100. 0 and σ=15. 0. A random sample of 45 people is taken. Step 1 of 2 : What is the probability of a random person on the street having an IQ score of less than 96? Round your answer to 4 decimal places, if necessary
We are given that IQ scores are normally distributed with mean μ = 100 and standard deviation σ = 15. We want to find the probability of a random person on the street having an IQ score of less than 96.
To do this, we need to standardize the IQ score using the z-score formula:
z = (x - μ) / σ
where x is the IQ score we're interested in, μ is the mean IQ score, and σ is the standard deviation of IQ scores.
Plugging in the given values, we get:
z = (96 - 100) / 15 = -0.267
Now, we look up the probability of getting a z-score less than -0.267 in a standard normal distribution table or using a calculator. The probability is approximately 0.3944.
Therefore, the probability of a random person on the street having an IQ score of less than 96 is 0.3944 (rounded to 4 decimal places).
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A dealer made lost of 10% by selling an article for 81,000 naira. How much should he have sold it to make a profit of 15%
The dealer should have sold the article for 103,500 naira to make a profit of 15%.
Let C be the cost price of the composition. According to the problem, the dealer vended the composition at a loss of 10, so he entered 90 of the cost price. thus, 90 of C is equal to 81,000 naira.
C = 81,000
C = 81,000/0.9
C = 90,000
So, the cost price of the composition is 90,000 naira.
Now, let's find out the selling price needed to make a profit of 15 Let S be the needed selling price to make a profit of 15. We know that profit chance is equal to( profit/ cost price) × 100.
Thus,(15/100) × 90,000 =
S- 90,000 , 500
= S- 90,000
S = 90,000 13,500
S = 103,500
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Question 16 (6 marks) If b and c are real numbers and b^2 <3c, show that the equation x^3 + bx^2 + cx = 2022 has exactly one real solution.
We have shown that the equation x^3 + bx^2 + cx = 2022 has exactly one real solution.
To show that the equation x^3 + bx^2 + cx = 2022 has exactly one real solution, we will use the discriminant (∆) of the equation. The discriminant helps us determine the nature of the solutions of a polynomial equation.
For a cubic equation, the discriminant is given by the following formula:
∆ = 18abcd - 4b^3d + b^2c^2 - 4ac^3 - 27a^2d^2
In our case, the equation is x^3 + bx^2 + cx - 2022 = 0, so a = 1, b = b, c = c, and d = -2022.
Now, let's calculate the discriminant:
∆ = 18(1)(b)(c)(-2022) - 4b^3(-2022) + b^2c^2 - 4(1)c^3 - 27(1)^2(-2022)^2
∆ = -36444bc + 8088b^3 + b^2c^2 - 4c^3 - 109222392
We are given that b^2 < 3c. This inequality implies that the first three terms of the discriminant will be negative, as b^2c^2 will be smaller than 3c^2. The negative terms will dominate the discriminant, making ∆ < 0.
When the discriminant of a cubic equation is negative (∆ < 0), it means that the equation has exactly one real solution. Thus, we have shown that the equation x^3 + bx^2 + cx = 2022 has exactly one real solution.
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The table shows the daily amount that Trevor spent on snacks. During
which week did Trevor spend a mean amount of $0. 85 per day on snacks? *
1 point
Week
Friday
$0. 50
1
Monday Tuesday Wednesday Thursday
$0. 75 $0. 50
$1. 00 $1. 25
$1. 25 $0. 75 $0. 25 $1. 00
$0. 50 $0. 75
$0. 25 $0. 25
$1. 25 $0. 25 $0. 75 $1. 00
$1. 00
AWN
$1. 25
$0. 50
Week 1
Week 2
Week 3
Week 4
Trevor spent a mean amount of $0.85 per day on snacks during
Week 1.
We have,
To determine during which week Trevor spent a mean amount of $0.85 per day on snacks, we need to calculate the mean (average) amount spent per day for each week and find the week that matches $0.85.
Let's calculate the mean amount spent per day for each week:
Week 1:
= (0.50 + 0.75 + 0.50 + 1.00 + 1.25 + 1.25 + 0.75 + 0.25 + 1.00) / 9
= $0.86 (approximately)
Week 2:
= (1.00 + 0.50 + 0.75 + 0.25 + 0.25 + 1.25 + 0.25) / 7
= $0.61 (approximately)
Week 3:
= (0.75 + 1.00) / 2
= $0.88
Week 4:
= (1.25 + 1.00 + 1.00 + 1.25 + 0.50) / 5
= $1.00
From the calculations, we can see that the mean amount spent per day for Week 1 is closest to $0.85.
Therefore,
Trevor spent a mean amount of $0.85 per day on snacks during
Week 1.
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Mark makes a pattern that starts with 5 and uses the rule "subtract 1, and then multiply by 3. " Which expression can be used to find the third number in Markâs pattern?
A. 5â1â3â1â3
B. 3(5â1)+3(5â1)
C. 3[3(5)â1]
D. 3[3(5â1)â1]
Choose one correct answer
The expression that can be used to find the third number in Mark's pattern is 3[3(5) - 1]. The correct option is C.
In Mark's pattern, the rule is to subtract 1 from the previous number and then multiply the result by 3.
Starting with 5 as the first number, we can apply this rule step by step to find the subsequent numbers.
First step: Subtract 1 from 5, giving us 4.
Second step: Multiply 4 by 3, which equals 12.
So, the second number in Mark's pattern is 12.
Now, to find the third number, we apply the same rule.
First step: Subtract 1 from 12, giving us 11.
Second step: Multiply 11 by 3, which equals 33.
Therefore, the third number in Mark's pattern is 33.
Option C, 3[3(5) - 1], correctly represents this calculation, where 5 is subtracted by 1, multiplied by 3, and then multiplied by 3 again.
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Use the drop down to answer the question about converting 0. 64 to a fraction.
How many repeating digits are in 0. 64 ?
What value is multiplied on both sides of the equals sign?
What fraction represents 0. 64 ?
The fraction value of 0.64 is 16/25 using the greatest common factor method to represent. There are no repeating digits in value.
The given decimal value = 0.64
There are no repeating numbers in the given decimal number 0.64.
To convert the given number into a fraction, we need to multiply the value with 10 on both sides to move the decimal point two places to the right.
0.64 × 100/100 = 64/100
Now simply this value by dividing both the numerator and denominator with the greatest common factor of both values. The greatest common factor is 4.
64/100 = 16/25
Therefore, we can represent the fraction value of 0.64 as 16/25.
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A downward opening parabola with vertex (-5,2) and a vertical compression of 0. 5
The equation of the downward opening parabola with the given vertex and vertical compression is y = 0.5(x + 5)^2 + 2
The equation of a downward opening parabola with vertex (h, k) and vertical compression a is given by:
y = a(x - h)^2 + k
In this case, the vertex is (-5, 2) and the vertical compression is 0.5. Therefore, we have:
h = -5
k = 2
a = 0.5
Substituting these values into the equation above, we get:
y = 0.5(x + 5)^2 + 2
This is the equation of the downward opening parabola with the given vertex and vertical compression.
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Learn with an example
or
Watc
4) Graph this line using intercepts:
3x + y = -6
Answer:
Step-by-step explanation:
3x+y = -6
y=-3x-6
The Y-intercept is -6, therefore there is one point (0,-6)
Now go 3 down and one right, so there is your second point (1,-9)
Can someone help me asap? It’s due today!! Show work! I will give brainliest if it’s correct and has work
Answer:
10 outcomes
Step-by-step explanation:
if 2 coins were selected with replacement=10×10=100
number of outcomes if 2 coins were selected without replacement=10×9=90
Finally, 100-90= 10 outcomes!
Your doing practice 6
Answer:
A ∪ B = {1, 2, 3, 4, 5, 6, 7, 9}
Step-by-step explanation:
We can find the union of two sets by including all of the numbers in both sets, but without repeating any numbers.
For example:
if A = {1, 2, 3, 4, 5} and B = {4, 5, 6, 7, 8},
then A ∪ B = {1, 2, 3, 4, 5, 6, 7, 8}
We can apply this concept to the problem at hand, but first we need to represent set A as a list of numbers:
They all have to be odd numbers between 0 and 10.
[tex]\implies A[/tex] = {1, 3, 5, 7, 9}
We are given that B = {2, 3, 4, 5, 6}. So, to find the union of A and B, we can combine both sets of numbers and get rid of copies:
A ∪ B = {1, 2, 3, 4, 5, 6, 7, 9}
Why do you think that credit cards tend to be the entry point for establishing credit for so many consumers?
I believe credit cards tend to be the entry point for establishing credit for so many consumers because they provide an easy and accessible way for individuals to begin building their credit history. Credit card companies report to credit bureaus on a regular basis, which helps establish a credit score and credit history.
Additionally, credit cards offer a convenient way for individuals to make purchases and build their credit at the same time. However, it is important for individuals to use their credit cards responsibly and make timely payments in order to maintain good credit standing.
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Find the area of the composite figure to the nearest hundredth.
55 mm
32. 5 mm
12. 5 mm
12. 5 mm
The area of the composite figure is approximately 2447.43 square millimeters to the nearest hundredth.
To find the area of the composite figure, we need to divide it into simpler shapes and then find their areas separately. The composite figure is made up of a rectangle and two semicircles.
First, let's find the area of the rectangle. The length of the rectangle is 55 mm and the width is 32.5 mm, so the area of the rectangle is:
[tex]$$A_{rect} = length \times width = 55 \text{ mm} \times 32.5 \text{ mm} = 1787.5 \text{ mm}^2$$[/tex]
Next, let's find the area of each semicircle. The diameter of each semicircle is equal to the width of the rectangle, which is 32.5 mm. Therefore, the radius of each semicircle is:
[tex]$$r =[/tex] [tex]\frac{32.5 \text{ mm}}{2} = 16.25 \text{ mm}$$[/tex]
The formula for the area of a semicircle is:
[tex]$$A_{semicircle} = \frac{1}{2} \pi r^2$$[/tex]
So, the area of each semicircle is:
[tex]$$A_{semicircle} = \frac{1}{2} \pi (16.25 \text{ mm})^2 \approx 329.97 \text{ mm}^2$$[/tex]
To find the total area of the composite figure, we add the area of the rectangle to the area of the two semicircles.
[tex]$$A_{total} = A_{rect} + 2 \times A_{semicircle} \approx 2447.43 \text{ mm}^2$$[/tex]
Therefore, the area of the composite figure is approximately 2447.43 square millimeters to the nearest hundredth.
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using known taylor series find the first 4 nonzero terms of thetaylor series for the function f(t)=e^(t)cos(t) about 0
The first four nonzero terms are 1 + t - (t^2)/2 - (t^3)/3 + (t^4)/8
To find the first 4 nonzero terms of the Taylor series for the function f(t) = e^(t)cos(t) about 0,
we can use the known Taylor series for e^(t) and cos(t).
Taylor series:
The Taylor series for e^(t) is:
e^(t) = 1 + t + (t^2)/2! + (t^3)/3! + ...
And the Taylor series for cos(t) is:
cos(t) = 1 - (t^2)/2! + (t^4)/4! - (t^6)/6! + ...
To find the Taylor series for f(t) = e^(t)cos(t), we can multiply these two series together using the distributive property of multiplication. We get:
f(t) = (1 + t + (t^2)/2! + (t^3)/3! + ...) * (1 - (t^2)/2! + (t^4)/4! - (t^6)/6! + ...)
Expanding this out, we get:
f(t) = 1 + t - (t^2)/2 - (t^3)/3 + (t^4)/8 + (t^5)/15 - (t^6)/72 - ...
The first 4 nonzero terms of this series are:
f(t) = 1 + t - (t^2)/2 - (t^3)/3 + (t^4)/8 + ...
So, the first 4 nonzero terms of the Taylor series for f(t) = e^(t)cos(t) about 0 are:
1 + t - (t^2)/2 - (t^3)/3 + (t^4)/8
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Consider the geometric series 1 - x/3 - x^2/9 - x^3/27......
What is the common ratio of the series and for what values of x will the series converge? Determine the function f representing the sum of the series.
The function f representing the sum of the series for x in the interval (-3, 3). Hi! The given geometric series is 1 - x/3 - x^2/9 - x^3/27...
The common ratio of the series is obtained by dividing a term by its preceding term. Let's consider the first two terms:
(-x/3) / 1 = -x/3
Therefore, the common ratio (r) of the series is -x/3.
For a geometric series to converge, the absolute value of the common ratio must be less than 1, i.e., |r| < 1. In this case:
|-x/3| < 1
To find the values of x for which the series converges, we need to solve the inequality:
-1 < x/3 < 1
Multiplying all sides by 3, we get:
-3 < x < 3
So, the series converges for x in the interval (-3, 3).
Now, let's determine the function f representing the sum of the series. For a converging geometric series, the sum S can be calculated using the formula:
S = a / (1 - r)
where a is the first term and r is the common ratio. In this case, a = 1 and r = -x/3. Therefore:
f(x) = 1 / (1 - (-x/3))
f(x) = 1 / (1 + x/3)
This is the function f representing the sum of the series for x in the interval (-3, 3).
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Karmen is buying a new car. For the car's exterior, she can choose from three colors-black, gray, or white. For the interior, she can choose between
belge and gray. She can also choose between a manual and an automatic transmission
if Karmen picks a car at random, what is the probability of picking a car that has a black exterior and a belge interior?
What is the probability of picking a car with a belge interior and an automatic transmission?
The probability of Karmen picking a car with a black exterior and a belge interior is
The probability of Karmen picking a car with a belge interior and an automatic transmission is
The probability of Karmen picking a car with a belge interior and an automatic transmission is 1/6
How to find the probability?To find the probability, we need to start by identifying the event or situation for which we want to calculate the probability.
Since Karmen has three choices for the exterior color, two choices for the interior color, and two choices for the transmission, the total number of possible car configurations is:
3 x 2 x 2 = 12
This means there are 12 different cars to choose from.
To find the probability of picking a car that has a black exterior and a belge interior, we need to determine how many cars meet these criteria. There is only one car that has a black exterior and a belge interior, so the probability of picking this car is:
1/12
Therefore, the probability of Karmen picking a car with a black exterior and a belge interior is 1/12.
To find the probability of picking a car with a belge interior and an automatic transmission, we need to determine how many cars meet these criteria. There are two cars that have a belge interior and an automatic transmission, so the probability of picking one of these cars is:
2/12
Simplifying this fraction gives:
1/6
Therefore, the probability of Karmen picking a car with a belge interior and an automatic transmission is 1/6.
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The unit in a volume are always ________.
Answer:
The unit in a volume are always cubic meter
Step-by-step explanation:
Chain of Thought Reasoning: Volume is a three dimensional space, which is measured in three dimensions (length, width, and depth). The SI unit for length is meters, so the SI unit for volume is cubic meters (m^3). I hope this helps you
Is Figure A'B'C'D' a reflection of Figure ABCD? Explain.
Trapezoid A B C D graphed in Quadrant 1 of a coordinate plane with vertices A, 2, 2, B, 4, 4, C, 8, 4, and D, 10, 2. Trapezoid A prime B prime C prime D prime graphed in Quadrant 4 of a coordinate plane with vertices A prime, 2, negative 4, B prime, 4, negative 6, C prime, 8, negative 6, and D prime, 10, negative 4. The horizontal line y equals negative 1 is graphed and is equidistant between the bases of the trapezoids.
Yes; it is a reflection over the x-axis.
Yes; it is a reflection over the y-axis.
Yes; it is a reflection over line y = –1.
No; it is not a reflection.
Where the above is given, it is correct to state that "Yes; it is a reflection over line y = –1." (Option C)
What is reflection in math?A reflection is referred to as a flip in geometry. A reflection is the shape's mirror image. The line of reflection is formed when an image reflects through a line. A figure is said to mirror another figure when every point in one figure is equidistant from every point in another figure.
Note that in the above prompt, Since the horiztonal line y = -1 is equidistant between the bases of the trapezoids, ABCD and A'B'C'D and the corresponding coordinates are therefore equidistant from the line.
Hence Option C is correct.
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Mr. Larson, a math teacher, assigned his students a project to do in pairs. He recorded the
grade each pair earned.
Math project grades
92 77 97 70 96 75
73
84
71
87
80
86
100
95
Which box plot represents the data?
Math project grades
50
60
70
80
90
100
Math project grades
50
60
70
80
90
100
The box plot that would represent the data recorded by Mr. Larson would be B. Second box plot.
How to find the box plot ?To find the correct box plot of the data recorded by Mr. Larson, the math teacher, first order the grades from lowest to highest :
70, 71, 73, 75, 77, 80, 84, 86, 87, 92, 95, 96, 97, 100
There are 14 grades which means that the median position would be the 7th and 8th grades average :
= ( 84 + 86 ) / 2
= 170 / 2
= 85
The position of Q3 would be:
= ( n + 1 ) x 75 %
= ( 14 + 1 ) x 75 %
= 11 th position which is 95
The correct box plot is therefore the second box plot which shows the Q3 as 95.
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