The composite functions are (A + B)(x) = x² + 2x + 4. and (AB)(x) = 2x³ - x² + 10x - 5.
Evaluating the composite functionsTo find (A + B)(x), we add the two functions A(x) and B(x):
(A + B)(x) = A(x) + B(x)
So, we have
= x² + 5 + 2x - 1 (substituting the given expressions for A(x) and B(x))
= x² + 2x + 4
Therefore, (A + B)(x) = x² + 2x + 4.
To find (AB)(x), we multiply the two functions A(x) and B(x):
(AB)(x) = A(x)B(x)
= (x² + 5)(2x - 1) (substituting the given expressions for A(x) and B(x))
= 2x³ - x² + 10x - 5
Therefore, (AB)(x) = 2x³ - x² + 10x - 5.
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Hashem puts boxes into small vans and into large vans.
He puts 5 boxes into each small van.
He puts 25 boxes into each large van.
Hashem puts a total of 400 boxes into the vans so that
number of boxes in small vans: number of boxes in large vans = 3:5
Hashem says that less than 30% of the vans filled with boxes are large vans.
Is Hashem correct?
You must show all your working.
Let's start by using algebra to solve for the number of boxes in small and large vans.
Let x be the number of small vans and y be the number of large vans. Based on the ratio given, we know that:
- Number of boxes in small vans = 3/8 * Total number of boxes
- Number of boxes in large vans = 5/8 * Total number of boxes
Using the information provided, we can write an equation:
5x + 25y = 400
Simplifying, we get:
x + 5y = 80
Now let's use the inequality provided to determine if less than 30% of the vans filled with boxes are large vans. We know that:
- Total number of vans filled with boxes = x + y
- Less than 30% of these vans are large vans, so y/(x+y) < 0.3
Substituting x + 5y = 80, we can simplify the inequality:
y/(x+y) < 0.3
y/80 < 0.3
y < 24
So if y (the number of large vans) is less than 24, then less than 30% of the vans filled with boxes are large vans.
Now we can solve for x and y using substitution. From x + 5y = 80, we get x = 80 - 5y. Substituting into 5x + 25y = 400, we get:
5(80 - 5y) + 25y = 400
400 - 20y = 400
20y = 0
y = 0
This means that y cannot be less than 24, as y = 0 would result in no large vans at all. Therefore, Hashem's statement is incorrect, and the number of large vans must be equal to or greater than 24.
the function f(x)=-5x^2 + 17x + 21 models the predicated sales of a pen after x price increase. use the table showing actual and predicted sales to find the residual for the models
To find the residual for each data point, we subtract the predicted sales from the actual sales. The residuals for the model are 1, 0, 1, and 1 for x=0, 1, 2, and 3 respectively.
To find the residual for each data point, we need to subtract the predicted sales from the actual sales:
For x=0: Residual = Actual sales - Predicted sales = 22 - 21 = 1
For x=1: Residual = Actual sales - Predicted sales = 33 - 33 = 0
For x=2: Residual = Actual sales - Predicted sales = 36 - 35 = 1
For x=3: Residual = Actual sales - Predicted sales = 28 - 27 = 1
Therefore, the residuals for the model are 1, 0, 1, and 1 for x=0, 1, 2, and 3 respectively.
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or differentiable parameterization of arc-length 2 in space ( not in a plane) how would you set up the function?
The function of differentiable parameterization of arc length 2 in space is ∫√(1)² + (2t)² + (cos(t))² dt.
To set up a differentiable parameterization of arc-length 2 in space, we can use the arc-length formula:
s = ∫√(dx/dt)² + (dy/dt)² + (dz/dt)² dt
where s is the arc length, t is the parameter, and (x, y, z) is the position vector.
We want the arc length to be 2, so we can set up the following equation:
2 = ∫√(dx/dt)² + (dy/dt)² + (dz/dt)² dt
We can then choose a function for each component of the position vector, such as:
x = t
y = t²
z = sin(t)
We can now find the derivatives with respect to t:
dx/dt = 1
dy/dt = 2t
dz/dt = cos(t)
We can substitute these into the arc-length formula:
2 = ∫√(1)² + (2t)² + (cos(t))² dt
Solving this integral for t will give us the desired parameterization of arc-length 2 in space. However, this integral may not have a closed-form solution, so numerical methods may need to be used to approximate the solution.
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The question is -
Differentiable parameterization of arc-length 2 in space ( not in a plane) how would you set up the function?
P ( rolling a composite number and the coin landing on heads and tails )
Assuming a standard six-sided die and a fair coin, the probability of rolling a composite number (any number that is not a prime number) on the die is 3/6 or 1/2, since there are three composite numbers (4, 6, 8) out of six possible outcomes (1, 2, 3, 4, 5, 6).
The probability of the coin landing on heads is 1/2, and the probability of it landing on tails is also 1/2. Therefore, the probability of both events happening together is:
P(composite number and heads and tails) = P(composite number) x P(heads) x P(tails)
P(composite number and heads and tails) = (1/2) x (1/2) x (1/2)
P(composite number and heads and tails) = 1/8
So the probability of rolling a composite number and the coin landing on heads and tails is 1/8.
the study shows that tayugineans drink an average of 1.64 cups of coffee per day with a variance of 0.0576. if five hundred tayugenians are selected, approximately how many of them will drink less than 1 cup of coffee per day?
If Tayugineans drink an average of 1.64 cups of coffee per day, then 0.38 percent will drink less than 1 cup-of-coffee per day.
The average number of cups of coffee drink is = 1.64 cups,
The variance is = 0.0576, So, the standard-deviation is = √0.0576 = 0.24,
Let us assume that the variable is normally-distributed with a standard deviation of 0.24 cup.
We have to find the persons who drink less than 1 cup of coffee,
It is calculated as : P(x < 1) ,
The corresponding z-value is = z = (1 - 1.64)/0.24 = -2.6667 ,
So, P(z < -2.67) = 0.0038 = 0.38%.
Therefore, 0.38% drink less than 1 cup of coffee per day.
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I have a question,what is 3x + 2 = 17
Answer: x=5
Step-by-step explanation:
First you gotta box the variable so you don't get confused. The opposite of adding 2 is subtracting so you subtract 2-2 which gives you 0 and subtract 17-2 which gives 15. THEN, you will have left 3x=15 in order to get rid of the three you have to divide by the 3 on both sides. Lastly, you get your answer! Hope this helps :D
explain what function (in mosaic ) and what parameters you should you use to find the value of z* for a specified confidence level c
This would give you a z* value of approximately 1.96.
To find the value of z* for a specified confidence level c in a mosaic function, you should use the inverse cumulative
distribution function (also called the quantile function or the z-score function). The parameters you need are the
desired confidence level (c) and the standard normal distribution.
Here are the steps to find the value of z*
1. Determine the desired confidence level (c). This is usually given as a percentage, like 95% or 99%.
2. Calculate the area under the curve corresponding to the confidence level. This is equal to (1 - c)/2.
3. Use the inverse cumulative distribution function (quantile function) with the standard normal distribution to find the z
score corresponding to the calculated area.
4. The resulting value is the z* value for the specified confidence level c.
For example, if you need to find the z* value for a 95% confidence level, you would calculate (1 - 0.95)/2 = 0.025, and
then use the inverse cumulative distribution function with the standard normal distribution to find the z-score
corresponding to 0.025. This would give you a z* value of approximately 1.96.
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The time taken T (in seconds) for the length of rope R (in metres) to be rotated about a central point is given by the formula T = √8R\2.5
a) Make R the subject of the formula.
b) what is the length of rope if it takes 16 seconds for a single revolution?
c) what is the time taken for a rope of length 18 metres to complete a revolution? Answer correct to one decimal place.
Full working please <3
we have derived the formula T = √(8R/2.5) for the time taken for a rope of length R to be rotated about a central point, made R the subject of the formula, and used the formula to calculate the length of a rope that takes 16 seconds for a single revolution and the time taken for a rope of length 18 metres to complete a revolution.
How to solve questions?
a) To make R the subject of the formula, we need to isolate it on one side of the equation. We start by rearranging the formula:
T = √(8R/2.5)
Squaring both sides of the equation, we get:
T²= 8R/2.5
Multiplying both sides by 2.5, we get:
2.5T²= 8R
Finally, dividing both sides by 8, we get:
R = 2.5T²/8
Therefore, R is given by the formula R = 2.5T²/8.
b) To find the length of rope if it takes 16 seconds for a single revolution, we can substitute T = 16 into the formula we derived in part (a):
R = 2.5T²/8 = 2.5(16)²/8 = 100
Therefore, the length of the rope is 100 metres.
c) To find the time taken for a rope of length 18 metres to complete a revolution, we can again use the formula we derived in part (a), but this time we substitute R = 18:
T = √(8R/2.5) = √(8*18/2.5) = √(115.2) ≈ 10.7 seconds
Therefore, the time taken for a rope of length 18 metres to complete a revolution is approximately 10.7 seconds, rounded to one decimal place.
In summary, we have derived the formula T = √(8R/2.5) for the time taken for a rope of length R to be rotated about a central point, made R the subject of the formula, and used the formula to calculate the length of a rope that takes 16 seconds for a single revolution and the time taken for a rope of length 18 metres to complete a revolution.
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What is 2^2000
2 to the power of 2000
Answer in number form. Not scientific notation or e notation.
Step-by-step explanation:
Not sure why you would want this...here is the result using a big number calculator on the internet:
2^2000 =
114,813,069,527,425,452,423,283,320,117,768,198,402,231,770,208,869,520,047,764,273,682,576,626,139,237,031,385,665,948,631,650,626,991,844,596,463,898,746,277,344,711,896,086,305,533,142,593,135,616,665,318,539,129,989,145,312,280,000,688,779,148,240,044,871,428,926,990,063,486,244,781,615,463,646,388,363,947,317,026,040,466,353,970,904,996,558,162,398,808,944,629,605,623,311,649,536,164,221,970,332,681,344,168,908,984,458,505,602,379,484,807,914,058,900,934,776,500,429,002,716,706,625,830,522,008,132,236,281,291,761,267,883,317,206,598,995,396,418,127,021,779,858,404,042,159,853,183,251,540,889,433,902,091,920,554,957,783,589,672,039,160,081,957,216,630,582,755,380,425,583,726,015,528,348,786,419,432,054,508,915,275,783,882,625,175,435,528,800,822,842,770,817,965,453,762,184,851,149,029,376
Find the exact circumference of the circle.
Options:
10π cm
11π cm
12π cm
Answer:
10π cm
Step-by-step explanation:
C = πd
First, we find the hypotenuse of the triangle which is the diameter of the circle.
a² + b² = c²
6² + 8² = c²
c² = 100
c = 10
d = 10 cm
C = πd
C = 10π cm
Pls im begging you do my math hw I just got back from a track meet
Answer:
x = 71
Step-by-step explanation:
180 degrees is how many degrees were in a triangle.
Add up the angles then subtract by 180 and there is your answer.
Max went to the store and bought a new iPad that was 45% of the original price he saved $135 because of the sale how much was the original price of the iPad
Answer:
$245.45
Step-by-step explanation:
.45c = $135, so c = $245.45
.45 × $245.45 = $110.45, a $135 savings.
the diameters of cylinders form a normal distribution with the mean of 5 cm and the standard deviation of 0.2 cm. katie ordered a cylinder from this population and the store manager told her that the cylinder she ordered is bigger than average in size. the manager specifically mentioned that her cylinder would be in the upper 10% in its size (diameter). what is the possible lowest diameter of katie's cylinder?
The possible lowest diameter of Katie's cylinder is approximately 5.26 cm.
To find the possible lowest diameter of Katie's cylinder, we'll use the concepts of normal distribution, mean, and standard deviation.
1. Recall the given information:
- Mean diameter (µ) = 5 cm
- Standard deviation (σ) = 0.2 cm
- Katie's cylinder is in the upper 10% in size (diameter).
2. Determine the z-score that corresponds to the upper 10% of the distribution:
To find the z-score for the upper 10%, you can use a z-table or a calculator with a built-in function to find the inverse of the cumulative distribution function (commonly known as the "inverse CDF" or "quantile" function). The z-score corresponding to the upper 10% is approximately 1.28.
3. Calculate the possible lowest diameter of Katie's cylinder using the z-score formula:
z = (X - µ) / σ
where:
- z is the z-score
- X is the diameter we want to find
- µ is the mean diameter
- σ is the standard deviation
4. Rearrange the formula to solve for X:
X = z * σ + µ
5. Plug in the values and solve for X:
X = (1.28 * 0.2) + 5
X = 0.256 + 5
X ≈ 5.26 cm
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MATCHING: Given a temperature F in degrees Fahrenheit, the expression C = 5/9(F - 32) gives the temperature in degrees Celsius. Evaluate the following Expressions and Match the correct answer to each the degrees listed. 3. F = 23 Answer 1 Choose... 5. F = -40 Answer 2 Choose... 1. F= 68 Answer 3 Choose... 2. F= 32 Answer 4 Choose... 4. F = -4 Answer 5 Choose...
The given Fahrenheit temperatures evaluated to their Celsius equivalents are: 68°F = 20°C, 32°F = 0°C, 23°F = -5°C, -4°F = -20°C, and -40°F = -40°C.
The expression C = 5/9(F - 32) is used to convert temperatures in degrees Fahrenheit to degrees Celsius. To evaluate the expression for a given Fahrenheit temperature, we simply substitute the value of F into the formula and perform the necessary calculations.
For example, when F = 68, we substitute the value of F into the formula and simplify as follows:
C = 5/9 (68 - 32)
C = 5/9 * 36
C = 20
Here are the evaluations of the given Fahrenheit temperatures in degrees Celsius using the formula C = 5/9(F - 32):
F= 68: C = 5/9(68-32) = 20
F= 32: C = 5/9(32-32) = 0
F= 23: C = 5/9(23-32) = -5
F= -4: C = 5/9(-4-32) = -20
F= -40: C = 5/9(-40-32) = -40
Matching the correct Celsius temperatures to their respective Fahrenheit temperatures:
F= 68: C = 20
F= 32: C = 0
F= 23: C = -5
F= -4: C = -20
F= -40: C = -40
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Given a temperature F in degrees Fahrenheit, the expression C = 5/9(F - 32) gives the temperature in degrees Celsius. Evaluate the following Expressions and Match the correct answer to each the degrees listed.
1. F= 68
2. F= 32
3. F = 23
4. F = -4
5. F = -40
I need to find the general equation for the circle that passes through the given points
The general equation for a circle with center (a,b) and radius r is:
[tex](x-a)^2 + (y-b)^2 = r^2[/tex]. By substituting the values and simplifying the equation, we will get 0.
What is circle ?
In math, a circle is a closed, two-dimensional shape made up of all elements that are spaced uniformly apart from the centre. The radius of something like the circle refers to this distance. Often, the letter "O" or "" is used to represent a circle. The circle is really a fundamental geometric shape and includes a number of significant characteristics, including its radius, which is the distance it around circle, or its area, which is the volume of the circle's interior. A circle's area is equal to 2 times its radius square, and its circumference is equal to 2 times its radius.
To find the equation for the circle that passes through the points (-5,0), (0,4), and (2,4), we need to find the center (a,b) and radius r.
First, we find the midpoint of the line segment between (-5,0) and (0,4), which is:
[tex]((-5+0)/2, (0+4)/2) = (-2.5,2)[/tex]
Next, we find the midpoint of the line segment between (0,4) and (2,4), which is:
[tex]((0+2)/2, 4/2) = (1,2)[/tex]
Since the circle passes through all three points, its center must be equidistant from all three points. Using the distance formula, we can set up three equations:
[tex](-2.5 - a)^2 + (2 - b)^2 = r^2[/tex]
[tex]a^2 + (4 - b)^2 = r^2[/tex]
[tex](1 - a)^2 + (2 - b)^2 = r^2[/tex]
Simplifying the equations and setting them equal to each other, we get:
[tex](-2.5 - a)^2 + (2 - b)^2 = a^2 + (4 - b)^2 = (1 - a)^2 + (2 - b)^2[/tex]
Expanding the squares and simplifying, we get:
[tex]6a - 10 = 0[/tex]
[tex]2b - 12 = 0[/tex]
Solving for a and b, we get:
a = 5/3
b = 6
Now we can find the radius of the circle by plugging in the values of a and b into one of the equations we set up earlier:
[tex]a^2 + (4 - b)^2 = r^2[/tex]
[tex](5/3)^2 + (4 - 6)^2 = r^2[/tex]
[tex]25/9 + 4 = r^2[/tex]
[tex]r^2 = 61/9[/tex]
Therefore, the equation of the circle is:
[tex](x - 5/3)^2 + (y - 6)^2 = 61/9[/tex]
Simplifying, we get:
[tex]4x^2 + 4y^2 - 40x + 48y + 167 = 0.[/tex]
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dominique is building a flower box for her yard. the outline of the box is shown in the diagram. if she wants to cover the box with burlap to protect it, how much burlap does she need to buy?
Once we have the total surface area, we will know how much burlap Dominique needs to buy to cover the flower box.
To determine how much burlap Dominique needs to buy to cover the flower box, we need to calculate the surface area of the box. Unfortunately, without the specific dimensions or a provided diagram,
I cannot give you an exact number.
However, here are the general steps to calculate the surface area of a rectangular flower box:
1. Identify the dimensions: length (L), width (W), and height (H).
2. Calculate the surface area of each face:
- Top/Bottom: 2 x (L x W)
- Sides: 2 x (L x H)
- Front/Back: 2 x (W x H)
3. Add the surface areas of all faces together to get the total surface area.
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Emily got her monthly credit card statement, which showed a bill of $156. She paid the minimum payment due, which was $30. If the interest rate was 15.5%, then Emily had to pay interest on the amount of $ _________ and the amount of interest to be paid would be __________.
Emily had to pay interest on the amount of $126 and the amount of interest to be paid would be $16.41.
What is interest rate?
Interest rate is the percentage charged by a lender to a borrower for the use of money, usually expressed as an annual percentage of the principal borrowed.
Emily had to pay interest on the remaining balance after making the minimum payment of $30.
Remaining balance = $156 - $30 = $126
The amount of interest to be paid would be calculated as:
interest = (interest rate/12) * remaining balance
Where 12 is the number of months in a year.
So,
interest = (15.5/12) * $126 = $16.41
Therefore, Emily had to pay interest on the amount of $126 and the amount of interest to be paid would be $16.41.
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What is the formula for the volume of a rectangular prism?
Answer:
V = (l)(w)(h)
Step-by-step explanation:
This is essentially volume equals length times width times height.
V: Volume
L: Length
W: Width
H: Height
This means, that to find the volume of a rectangular prism, you multiply length times width times height. This also works if you have the values of volume and 2 values from length, width, or height, because you can rearrange the equation.
Please give me Brainliest :)What is the correct mathematical description for the expression 25 ÷ 5 + (6 x 2) − 4.5? 25 divided by 5 plus 6 times 2 minus 4 and 5 tenths 25 divided by the sum of 5 and 6 times 2 minus 4 and 5 tenths 25 divided by 5 plus 6 times the difference of 2 and 4 and 5 tenths 25 divided by 5 plus the product of 6 and 2 minus 4 and 5 tenths
Answer:
The last option is correct
Step-by-step explanation:
a rectangular box has a square base. if the sum of the height and the perimeter of the square base is 14 14 in, what is the maximum possible volume?
If the sum of the height and the perimeter of the square base is 14 in, the maximum possible volume is 54 in³.
Let x represent the square box's rectangular base's side length.
Suppose h is the height.
Volume V should be used.
Considering that the square base's height plus perimeter equals 14 inches.
h + 4x = 18
Subtract 4x on both side, we get
h = 18 - 4x..........(1)
The volume is given as:
V = Area × Height
V = x² × h
Substitute the value of h
V = x² × (18 - 4x)
V = 18x² - 4x³..........(2)
Differentiate the equation 2 with respect to x
dV/dx = 36x - 12x²..........(3)
For the critical numbers,
dV/dx = 0
So, 36x - 12x² = 0
x(36 - 12x) = 0
x(-12x + 36) = 0
Equating equal to 0
x = 0 -12x + 36 = 0
x = 0 -12x = -36
x = 0 x = 3
Differentiate the equation 3 with respect to x
d²V/dx² = 36 - 24x
At x = 3 the value of d²V/dx² is
d²V/dx² = 36 - 24 × 3
d²V/dx² = 36 - 72
d²V/dx² = -36 < 0
x = 3 corresponds to the maximum of the volume V according to the second derivative test.
Now from the equation 1;
[tex]V_{\text{max}}[/tex] = 18(3)² - 4(3)³
[tex]V_{\text{max}}[/tex] = 18(9) - 4(27)
[tex]V_{\text{max}}[/tex] = 162 - 108
[tex]V_{\text{max}}[/tex] = 54 in³
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Which graph best represents a function with a range of all real numbers greater than or equal to -3
Answer: Without the graphs posted in your question, unfortunately it is not possible for me to provide you an answer. Please include the graphs given in your question so that I can provide an accurate response.
A player kicks a football off the ground so that if travels with a velocity of 32 miles per hour at an angle of 34° with the ground. Find the magnitude of the horizontal and vertical components.
As a result, the horizontal component of velocity has a magnitude of 11.8 m/s\ while the vertical component of velocity has a value of 8.0 m/s.
What is velocity?The pace at which an item changes its position is described by a vector quantity called velocity. It is described as the rate at which displacement changes in relation to time The amount and direction of velocity are both present. Speed refers to the velocity's magnitude.
The football's velocity in this scenario is 32 miles per hour, or around 14.3 meters per second.
We can use trigonometry to determine the sizes of a velocity vector's horizontal and vertical components.
Vₓ = V cos (theta), where V is the magnitude of the velocity vector and theta is the angle that the velocity vector makes with the horizontal axis, gives the horizontal component of velocity.
Vy = V sin (theta), where V is the magnitude of the velocity vector and theta is the angle that the velocity vector makes with the horizontal axis, gives the vertical component of velocity.
In this instance, we are aware of the football's velocity, which is 32 miles per hour, or around 14.3 meters per second6. It makes a 34 degree 6 angle with the ground.
Therefore,
Vₓ= V cos (theta) * cos (34 degrees) = 14.3 m/s * 11.8 m/s
Vy = V sin (theta) * sin (34 degrees) = 14.3 m/s * 8.0 m/s
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The scatter plot shows the number of chin-ups and push-ups several students did.
The scatter plot suggests that there is a relationship between the number of chinups and push-ups, but it is not a perfect relationship
What is Scatter plot ?
A scatter plot is a type of graph that is used to display the relationship between two variables. It is a visual representation of a set of data points, where each point represents the values of two variables for a single observation.
Based on the scatter plot, it appears that there is a positive correlation between the number of chin-ups and push-ups several students did. This means that as the number of chin-ups increase, the number of push-ups also tend to increase.
We can see this trend in the general upward slope of the points in the scatter plot. However, there is also a fair amount of variability in the data, as some students did more push-ups than others even when they did a similar number of chin-ups.
Therefore, the scatter plot suggests that there is a relationship between the number of chin-ups and push-ups, but it is not a perfect relationship
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Razak's mother weighs, 64.8kg. If she weighs 4 times the weight of Razak, What is Razak's weight?
Razak weighs 16.2 kg. To find Razak's weight, we need to use the information given in the problem that his mother weighs 4 times his weight.
Let's use the variable "R" to represent Razak's weight in kilograms. According to the problem, Razak's mother weighs 4 times Razak's weight, so we can write an equation:
Mother's weight = 4 * Razak's weight
64.8 = 4R
To solve for R, we can divide both sides by 4:
64.8 / 4 = R
16.2 = R
Therefore, Razak weighs 16.2 kg.
It's important to note that in solving this problem, we assumed that the weight of Razak's mother was accurately given in the problem. Additionally, we assumed that the units of measurement were in kilograms. If the problem used different units, we would need to convert them to kilograms before solving the equation.
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8. A square and its dimensions are shown below. What is the perimeter of the square?
Step-by-step explanation:
Perimeter is the sum of all of the sides
add all of the 3x + 3 's
3x+3 + 3x +3 + 3x+3 + 3x + 3 = 12x + 12 units
y-2=1/3(x+6) in standard form (Ax+By=c)
Answer:x-3y=-12
Step-by-step explanation:just trust me
M and N are the mid point of opposite sides of a square ABCD.a point is selected randomly in the square find the probability that it lies
1. in ∆ADM
2.in ∆ADM but not ∆ADN
3neither in ∆ADM nor in ∆ADN
The probability of selecting a point
1) in ΔADN is also 1/8.
2) in ΔADM but not in ΔADN is 0.
3) lies neither in ΔADM nor in ΔADN is 3/4.
What is probability?
Probability is a measure of the likelihood or chance of an event occurring. It is a number between 0 and 1, with 0 representing an impossible event and 1 representing a certain event. The probability of an event is calculated by dividing the number of ways the event can occur by the total number of possible outcomes.
To solve this problem, we need to use the fact that the diagonals of a square bisect each other and are perpendicular. Let's denote the midpoint of AB as P and the midpoint of BC as Q.
To find the probability that a point selected randomly in the square lies in ΔADM, we need to find the ratio of the area of ΔADM to the area of the square ABCD.
Since M is the midpoint of AD, we have DM = AM = 1/2 * AB. Similarly, since N is the midpoint of CD, we have DN = CN = 1/2 * BC.
Thus, the area of ΔADM is (1/2 * DM * AM) = (1/2 * 1/2 * AB * 1/2 * AB) = 1/8 * AB². The area of the square is AB². Therefore, the probability of selecting a point in ΔADM is (1/8 * AB²) / AB² = 1/8.
To find the probability that a point selected randomly in the square lies in ΔADM but not in ΔADN, we need to subtract the probability of selecting a point in ΔADN from the probability of selecting a point in ΔADM. Since N is the midpoint of CD, we have AN = 1/2 * AB, and therefore DN = 1/2 * BC = 1/2 * AB.
Thus, the area of ΔADN is (1/2 * DN * AN) = (1/2 * 1/2 * AB * 1/2 * AB) = 1/8 * AB², which is the same as the area of ΔADM.
Therefore, the probability of selecting a point in ΔADN is also 1/8.
The probability of selecting a point in ΔADM but not in ΔADN is (1/8 * AB²) - (1/8 * AB²) = 0.
To find the probability that a point selected randomly in the square lies neither in ΔADM nor in ΔADN, we need to subtract the probability of selecting a point in ΔADM from the probability of selecting a point in the square and then subtract the probability of selecting a point in ΔADN from that result.
The probability of selecting a point in the square is 1.
The probability of selecting a point in ΔADM is 1/8, and the probability of selecting a point in ΔADN is also 1/8.
Therefore, the probability of selecting a point that lies neither in ΔADM nor in ΔADN is 1 - (1/8 + 1/8) = 3/4.
Hence, the probability of selecting a point
1) in ΔADN is also 1/8.
2) in ΔADM but not in ΔADN is 0.
3) lies neither in ΔADM nor in ΔADN is 3/4.
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How many square centimeters are in the total surface area
of this cylinder? Express your answer to 2 decimal places?
4.0 cm
2.5 cm
Total surface area of this cylinder, the answer is (C) 163.36 cm².
What is an area ?
The total surface area of a cylinder can be found using the formula:
surface area = 2πr² + 2πrh
where r is the radius and h is the height.
Substituting the given values, we get:
surface area = 2π(4.0)² + 2π(4.0)(2.5)
= 2π(16.0) + 2π(10.0)
= 32π + 20π
= 52π
Using the approximation 3.14 for π and rounding to 2 decimal places, we get:
surface area ≈ 52(3.14) ≈ 163.36 cm²
Therefore, the answer is (C) 163.36 cm².
What is cylinder?
A cylinder is a three-dimensional shape that has two circular bases that are parallel and congruent to each other. The sides of a cylinder are curved, and they connect the bases. A cylinder has a constant cross-sectional area throughout its height, and it is a type of prism. The height of a cylinder is the perpendicular distance between the bases.
The volume of a cylinder can be calculated using the formula V = πr²h, where r is the radius of the base and h is the height of the cylinder. The surface area of a cylinder can be calculated using the formula A = 2πr² + 2πrh, where r is the radius of the base and h is the height of the cylinder. Cylinders are commonly found in everyday objects such as cans, pipes, and containers.
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For Jenna's birthday, her mom is paying for Jenna and three friends to spend a day at a water park. Jenna's mom plans to enjoy the water park, also. The cost to
go to the water park is park entrance price, the cost of food and drinks, and the cost of gas. Jenna's mom decides to purchase each person a park entrance ticket
that includes a full-day food and drink package. On average, the cost of gas for their vehicle is $0.18 per mile. Jenna's mom is going to pick up each friend and
take each one home, so she doesn't know the exact number of miles that the trip will be.
This expression shows the total cost for Jenna's water park birthday celebration for a miles.
5 (68) + 0.18z
What does the item 5 (68) represent?
A
the amount of money Jenna's mom must pay for all of the the park entrance tickets with the full-day food and drink package
B
the amount of money that each person attending the party must pay for the park entrance ticket with the full-day food and drink package
C the amount of money Jenna's mom must pay for gas to travel to the water park and back home
D the total cost for Jenna's water park birthday celebration
The number 5 (68) denotes how much Jenna's mother must spend on all of the park entrance tickets along with the full-day food and beverage package.
the total cost for Jenna's water park birthday celebration:Total cost = 5 x 68 + 0.18z
.Equations Let's break down the expression 5 (68):
The number 68 represents the cost of one park entrance ticket with the full-day food and drink package.The number 5 represents the total number of people who need a park entrance ticket with the full-day food and drink package, which includes Jenna and her three friends plus Jenna's mom.So, we can write the following equation to represent the total cost of the park entrance tickets with the full-day food and drink package:
Total cost of park entrance tickets with the full-day food and drink package = 5 x 68Now let's look at the rest of the expression:The number 0.18 represents the cost per mile for gas.The variable z represents the total number of miles that Jenna's mom will drive to take each friend to and from the water park.
So, we can write the following equation to represent the total cost of gas for the trip:Total cost of gas = 0.18zFinally, we can add these two expressions together to get the total cost for Jenna's water park birthday celebration:Total cost = 5 x 68 + 0.18z
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A rectangle garden has one side that is 6 feet longer than the other. A lawn care company installs synthetic grass that costs $8 per square foot in the entire.
If x represents the length, in feet, of the shorter side of the garden, and y represents the total cost, in dollars, to install the synthetic grass, which equation correctly shows the relationship between x and y?
Answer:
Step-by-step explanation:
The area of the rectangle garden can be expressed as:
Area = Length × Width
Since one side is 6 feet longer than the other, we can express the length as:
Length = Width + 6
Substituting this expression for length into the area formula, we get:
Area = (Width + 6) × Width
Simplifying this expression, we get:
Area = Width² + 6Width
The cost to install synthetic grass is given as $8 per square foot, so the total cost y can be expressed as:
y = 8(Area)
Substituting the expression for area that we found earlier, we get:
y = 8(Width² + 6Width)
Simplifying this expression, we get:
y = 8Width² + 48Width
Therefore, the equation that correctly shows the relationship between x (the length of the shorter side of the garden) and y (the total cost to install synthetic grass) is:
y = 8x² + 48x