Answer:24 seconds
Step-by-step explanation:
Since A(t) equals the total number of pixels in the image, then to figure out when it will be zero you just need to set A(t) equal to zero. This gives you the equation
[tex]0=(256-8t)(192-8t)[/tex]
Since this equation equals zero, we know either 256-8t must equal 0 or 192-8t must since they are multiplied.
We can split this into two equations
[tex]256-8t=0[/tex]
[tex]8t=256\\t=32[/tex]
and
[tex]192-8t=0\\8t=192\\t=24[/tex]
So, after 24 and 32 seconds both the width and height equal zero. Only the height or the width need to equal zero for the total area to equal zero (A=w*h), so we go with the lesser time, 24 seconds.
1+20
i dont knwo what it it
Answer:
21
Step-by-step explanation:
20+1=21
QUICK! I need help with this one please
The first term of the polynomial in standard form must be 4y⁴
If Julian wrote the last term as -3x⁴, the terms with the highest degree must have a coefficient of 3.
To get the standard form, we need to combine like terms and arrange the terms in descending order of degree.
The polynomial can be simplified as follows:
4x²y²-2y⁴-8xy³+9x³y+6y⁴-2xy³-3x⁴+x²y²
= -3x⁴ + (4x²y² + x²y²) + (-2y⁴ + 6y⁴) + (-8xy³ - 2xy³) + 9x³y
= -3x⁴ + 5x²y² + 4y⁴ - 10xy³ + 9x³y
Therefore, the standard form of the polynomial is
-3x⁴ + 5x²y² + 4y⁴ - 10xy³ + 9x³y
= 4y⁴ + 5x²y² + -3x⁴ - 10xy³ + 9x³y
The term with the highest degree is -3x⁴, and the terms are arranged in descending order of degree. The answer is not one of the options given.
Therefore, the first term of the polynomial in standard form must be 4y⁴.
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the weekly sales at two movie theaters were recorded for a random sample of 25 weeks. a 95 percent confidence interval for the difference in mean weekly sales for the two movie theaters was calculated as
To calculate the 95% confidence interval for the difference in mean weekly sales for the two movie theaters, follow these steps:
Step 1: Gather the data for the random sample of 25 weeks.
Step 2: Calculate the mean and standard deviation for each movie theater's weekly sales.
Step 3: Calculate the difference in mean weekly sales for the two movie theaters (subtract the mean of theater 2 from the mean of theater 1).
Step 4: Calculate the standard error of the difference by taking the square root of [(standard deviation of theater 1^2 / number of weeks) + (standard deviation of theater 2^2 / number of weeks)].
Step 5: Determine the critical value for a 95% confidence interval using a t-table or calculator (for a two-tailed test with 24 degrees of freedom, the critical value is approximately 2.064).
Step 6: Multiply the critical value by the standard error to get the margin of error.
Step 7: Calculate the lower and upper bounds of the confidence interval by subtracting and adding the margin of error from the difference in mean weekly sales.
The result will be the 95% confidence interval for the difference in mean weekly sales for the two movie theaters.
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Find X in this equation: 5x^2-5x-30=0
x=? x=???
Answer:
x1 = -2;
x2 = 3
Step-by-step explanation:
[tex]5 {x}^{2} - 5x - 30 = 0[/tex]
Solve this quadratic equation (a = 5; b = -5; c = -30)
[tex]d = {b}^{2} - 4ac = ( { - 5})^{2} - 4 \times 5 \times ( - 30) = 25 + 600 = 625 > 0[/tex]
x1 = (-b - √d) / 2a = (5 - 25) / 2 × 5 = -20 / 10 = -2
[tex]x2 = \frac{ - b + \sqrt{d} }{2a} = \frac{5 + 25}{2 \times 5} = \frac{30}{10} = 3[/tex]
Which represents an exterior anglA triangle is sitting on a horizontal line. The bottom left interior angle of the triangle is (9 + k) degrees. The exterior angle to the bottom left interior angle is (5 k minus 3) degrees.
What is the value of k?
e of triangle ABF?
The value of k is approximately 10.33.
What is the exterior angle?
An exterior angle is an angle that forms a linear pair with an interior angle of a polygon. It is formed by extending one of the sides of the polygon. In other words, it is the angle formed between a side of a polygon and the extension of an adjacent side.
In a triangle, the measure of an exterior angle is equal to the sum of the measures of its two remote interior angles. In this problem, the exterior angle to the bottom left interior angle is (5k - 3) degrees, and the corresponding remote interior angle is (9 + k) degrees. Therefore, we can write:
(5k - 3) = (9 + k) + x
where x is the other remote interior angle of the triangle.
Simplifying this equation, we get:
5k - 3 = 9 + k + x
4k = 12 + x
x = 4k - 12
Now, we know that the sum of the interior angles of a triangle is 180 degrees. So, we can write:
(9 + k) + (5k - 3) + x = 180
Substituting x with 4k - 12, we get:
(9 + k) + (5k - 3) + (4k - 12) = 180
Simplifying this equation, we get:
18k - 6 = 180
18k = 186
k = 10.33 (rounded to two decimal places)
Therefore, the value of k is approximately 10.33.
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Find the Area of the figure below, composed of a rectangle with a semicircle removed from it. Round to the nearest tenths place.
Step-by-step explanation:
as the description says, the area is a rectangle (8×4) minus the half-circle at the right.
the radius of the (half-)circle is 4/2 = 2, as 4 is the diameter.
the area of the circle is
pi×r² = pi×2² = 4pi
the area of the half-circle is then
4pi/2 = 2pi
the area of the rectangle is
8×4 = 32
the total area is
32 - 2pi = 25.71681469... ≈ 25.7 square units
Answer:
25.7 square units
Step-by-step explanation:
You want the area of a 4 × 8 rectangle with a semicircle of diameter 4 removed from the end.
AreaThe area of the enclosing rectangle is ...
A = LW
A = (8)(4) = 32 . . . . . square units
The are of the missing semicircle is ...
A = 1/2πr² . . . . . . where r is half the diameter
A = 1/2π(4/2)² = 2π ≈ 6.3 . . . . . square units
Then the area of the figure is ...
A = rectangle - semicircle = 32 -6.3 = 25.7 . . . . . square units
The area of the figure is about 25.7 square units.
In the diagram below, find the indicated segment length. Assume that lines or segments which appear to be tangent are tangent.
Step-by-step explanation:
16 is tangent and the radial (12) is perpendicular
so this is a right triangle
Use Pythagorean theorem
?^2 = 12^2 + 16^2
?^2 = 400
? = 20 units
In the graph shown below, what is f(2)?
A. f(2) = 2
B. f(2) = 1
C. f(2) -1 and f(2) = 2
D. f(2) doesn't exist
Maceeey's family wants to buy a new desktop computer. The sides of the screen are 20 inches by 24 inches. What is the diagonal of the screen?
i need to identify the value of x that makes each pair of ratios equivalent
1. 2:x and 12:18
2. 5:15 and x:3
3. x:4 and 45:20
4. 21 to x and 7 to 10
5. x to 50 and 16 to 25
6. 6 to 8 and 18 to x
7. 9/36 and x/4
8. 42/22 and 21/x
9. x/7 and 5/1
10. 20/x 4/8
i cant even understand the subject its too hard for me
Answer:
lbozo
Step-by-step explanation:
Please help quickkkkkkk
2(6×7) + 2(3×7) + 2(3×6)
= 162
Please lmk asap, I’m so lost.
The complete table is:
x f(x)
-8 -8
-1 -8
1 -8
And the graph can be seen in the image at the end.
How to complete the table?Here we have the function:
f(x) = -8
This is a constant function, for every input that we use, the output will be the same one, then:
f(-8) = -8
f(-1) = -8
f(1) = -8
Then the complete table is:
x f(x)
-8 -8
-1 -8
1 -8
And the graph of these 3 points can be seen in the image at the end.
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a scientist has two solutions, which she has labeled solution a and solution b. each contains salt. she knows that solution a is 35% salt and solution b is 85% salt. she wants to obtain 150 ounces of a mixture that is 40% salt. how many ounces of each solution should she use?
Answer:
To solve this problem, we can use a system of equations. Let x be the number of ounces of solution A and y be the number of ounces of solution B. Then we have: x + y = 150 (total solution) 0.35x + 0.85y = 0.4(150) (total salt) Simplifying the second equation, we get: 0.35x + 0.85y = 60 Multiplying both sides of the first equation by 0.35 and subtracting from the second equation, we get: 0.5y = 15 y = 30 Substituting y = 30 into the first equation, we get: x + 30 = 150 x = 120 Therefore, the scientist should use 120 ounces of solution A and 30 ounces of solution B to obtain
The scientist should use 135 ounces of solution a and 15 ounces of solution b to obtain 150 ounces of a mixture that is 40% salt. This can be answered by the concept of system of equations.
To solve this problem, we can use a system of equations. Let x be the number of ounces of solution a used, and y be the number of ounces of solution b used. We want to find x and y such that:
x + y = 150 (we need 150 ounces of the mixture)
0.35x + 0.85y = 0.4(150) (the total amount of salt in the mixture should be 40% of 150 ounces)
We can solve this system of equations by first multiplying the second equation by 100 to get rid of the decimals:
35x + 85y = 6000
Then we can use the first equation to solve for one variable in terms of the other:
y = 150 - x
Substituting this into the second equation, we get:
35x + 85(150 - x) = 6000
35x + 12750 - 85x = 6000
-50x = -6750
x = 135
Therefore, the scientist should use 135 ounces of solution a and 15 ounces of solution b.
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For the following image, find x :
x =
Answer:
x = 11
Step-by-step explanation:
[tex] \frac{8}{48} = \frac{x}{x + 55} [/tex]
[tex]8(x + 55) = 48x[/tex]
[tex]8x + 440 = 48x[/tex]
[tex]40x = 440[/tex]
[tex]x = 11[/tex]
a survey revealed that 21.5% of the households had no checking account, 66.9% had regular checking accounts, and 11.6% had now accounts. of those households with no checking account 40% had savings accounts. of the households with regular checking accounts 71.6% had a savings account. of the households with now accounts 79.3% had savings accounts. the probability that a randomly selected household has a savings account is:
The probability that a randomly selected household has a savings account is 57.16%. therefore, correct option is (C) 57.16%.
Given,
A survey revealed that 21.5% of the households had no checking account.
Of those households with no checking account, 40% had savings accounts.= 21.5% × 40%= 0.086%66.9%
had regular checking accounts. Of the households with regular checking accounts,
71.6% had a savings account.= 66.9% × 71.6%= 47.8916%11.6% had now accounts.
Of the households with now accounts,
79.3% had savings accounts.= 11.6% × 79.3%= 9.1828%
Therefore, the probability that a randomly selected household has a savings account is:
0.086 + 47.8916 + 9.1828 = 57.16%
So, the correct option is (C) 57.16%.
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In a lab experiment, a population of 250 bacteria is able to triple every hour. Which equation matches the number of bacteria in the population after 8 hours?
Answer: 5,250
Step-by-step explanation:
250x3=750
750x7
a bottle of soap cost 3.45 for 15 ounces. what is the cost per ounce?
Answer:
Step-by-step explanation:
15 divided by 15 is 1
3.45 divided by 15 is 0.23
The cost per ounce is 23 cents, or $0.23
Mr. Sonny's science class is calculating the average number of blinks per minute. Jan blinks 100 times in 5 minutes. What is her blinking rate, in blinks per minute?
What is the equation of a line parallel to y=-5x+3 that passes through (3,7)
A seagull is 23 meters above the surface of the ocean. What is its elevation?
Answer: 23 meter
Step-by-step explanation:
meters "above"
elevation means the distance above sea level
The radius of container M is 3 inches and the height is 9.5 inches. A cook has
several boxes of sugar that are each the same size and volume. The cook empties 1
box of sugar into container M. He then empties of another box of sugar into
container M to completely fill it. What is the approximate volume, in cubic Inches, of
1 box of sugar?
The volume of container M can be calculated using the formula for the volume of a cylinder:
V = πr^2h
where V is the volume, r is the radius, and h is the height.
Substituting the given values, we have:
V = π(3 in)^2(9.5 in)
V ≈ 254.47 cubic inches
Let x be the volume of one box of sugar. According to the problem, the cook emptied one box of sugar into the container, and then added some fraction of another box to completely fill it. This means that the total volume of sugar added is equal to 1 + some fraction of x.
We can set up an equation to solve for x:
1 + (1/n)x = 254.47
where n is the fraction of the second box of sugar added.
Solving for x, we get:
x = (254.47 - 1) n
x = 253.47n
To find the value of n, we can subtract 1 box of sugar from the total volume added, and then divide by the volume of one box:
n = (254.47 - 1) / x
n = 253.47 / x
Substituting the expression for x from above, we get:
n = 253.47 / (253.47n)
n^2 = 253.47 / 1
n ≈ 15.93
Therefore, the volume of one box of sugar is approximately:
x ≈ 253.47 / 15.93
x ≈ 15.91 cubic inches
Properties of equality reference packet geometry
The properties used were the distributive property of multiplication over addition, the subtraction property of equality, and the multiplication property of equality.
What are properties?Properties are statements that are true for a wide range of numbers or equations. They are rules that describe the behavior of mathematical objects and relationships between them.
According to question:1) Given 4x-1=27, we can use the addition property of equality to add 1 to both sides:
4x-1+1 = 27+1
Simplifying, we get:
4x = 28
Then, we can use the multiplication property of equality to divide both sides by 4:
4x/4 = 28/4
Simplifying, we get:
x = 7
Therefore, we have proved that if 4x-1=27, then x=7.
The properties used were the addition property of equality and the multiplication property of equality.
2) Given (a/(-6))+2=5, we can use the subtraction property of equality to subtract 2 from both sides:
(a/(-6))+2-2 = 5-2
Simplifying, we get:
a/(-6) = 3
Then, we can use the multiplication property of equality to multiply both sides by -6:
(a/(-6))(-6) = 3(-6)
Simplifying, we get:
a = -18
Therefore, we have proved that if (a/(-6))+2=5, then a=-18.
3) The properties used were the subtraction property of equality and the multiplication property of equality.
Given -9(2x-3)=63, we can use the distributive property of multiplication over addition to simplify the left-hand side:
-9(2x-3) = -18x + 27
Then, we can use the subtraction property of equality to subtract 27 from both sides:
-18x + 27 - 27 = 63 - 27
Simplifying, we get:
-18x = 36
Finally, we can use the multiplication property of equality to divide both sides by -18:
(-18x)/(-18) = 36/(-18)
Simplifying, we get:
x = -2
Therefore, we have proved that if -9(2x-3)=63, then x=-2.
The properties used were the distributive property of multiplication over addition, the subtraction property of equality, and the multiplication property of equality.
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what is the value of the expression 2x^2-5xy when x =-3 and y=8?
Answer:
156
Step-by-step explanation:
The value of the expression 2x^2 - 5xy when x = -3 and y = 8 is 138.
Explanation:To find the value of the expression, 2x^2 - 5xy, when x = -3 and y = 8, we just need to substitute the given values into the expression.
So, 2x^2 - 5xy becomes 2*(-3)^2 - 5*(-3)*8 = 2*9 + 15*8 = 18 + 120 = 138
Therefore, the value of the expression 2x^2 - 5xy when x = -3 and y = 8 is 138.
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For the situation is below, define a random variable X for the situation, and then decide if they follow a binomial distribution model by commenting on the floor requirements.
1. You roll a DnD (20-sided), 20 times and record the number that shows on the dice.
After answering the presented question, we can conclude that The equation number of trials is predetermined: We're going to roll the dice 20 times.
What is equation?An equation is a statement in mathematics that shows that two expressions are equal. It consists of two sides separated by an equal sign (=). For example, 2 + 3 = 5 is an equation because the expression on the left-hand side (2 + 3) is equal to the expression on the right-hand side (5).
Equations are used in many areas of mathematics, science, and engineering to describe relationships between quantities and to solve problems. For example, equations are used to model physical phenomena, such as the motion of objects, the behavior of fluids, and the propagation of waves. They are also used in finance, statistics, and many other fields to analyze data and make predictions.
In this case, the random variable X reflects the number of times a specific number appears after rolling a 20-sided die 20 times.
To see if this situation fits the binomial distribution model, we must look at the four conditions listed below:
The trials are impartial: Each throw of the dice is distinct from the others.
There are just two possibilities: Each roll can produce one of the 20 numbers or none at all.
The likelihood of success is constant: The probability of rolling a given number on a 20-sided dice is the same for each roll.
The number of trials is predetermined: We're going to roll the dice 20 times.
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The path of the basketball is modeled by the equation h() = −.25 + 2 + 4 where t is the time in seconds and h(t) is the height of the basketball at time t. What type of vertex (minimum or maximum) would this quadratic function create? Explain, using any method, how you found your answer.
To determine the type of vertex created by this quadratic function, we need to find the vertex of the parabola. The vertex of a parabola is the point where the parabola reaches its minimum or maximum value.
What is the vertex of a quadratic function?The given equation [tex]h(t) = -0.25t^2 + 2t + 4[/tex] represents the height of the basketball as a function of time.
The vertex of a quadratic function in the form of [tex]f(x) = ax^2 + bx + c[/tex] can be found by using the formula:
[tex]x = -b/2a[/tex]
[tex]y = f(x) = a(x^2) + bx + c[/tex]
where (x,y) is the vertex of the parabola.
Comparing this with the given equation [tex]h(t) = -0.25t^2 + 2t + 4[/tex] , we see that a = -0.25, b = 2, and c = 4.
Substituting these values in the formula, we get:
[tex]t = -2/(2\times(-0.25)) = 4[/tex]
[tex]h(4) = -0.25(4)^2 + 2(4) + 4 = 6[/tex]
Therefore, the vertex of the parabola is [tex](4, 6)[/tex] . Since the coefficient of the t^2 term is negative, the parabola opens downwards, and the vertex represents the maximum point of the parabola. The quadratic function [tex]h(t) = -0.25t^2 + 2t + 4[/tex] would create a maximum vertex.
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Which graph represents the function f (x) = 3 +4?
The graph that closely matches the function is graph C.
The price of a regular snowcone at Icy's Snowcone Stand is $2.85
Find the volume of a regular snowcone.
Find the price per cubic inch of a regular snowcone.
6in and 3in
The volume of a regular snowcone is 56.52 in³.
The price per cubic inch of a regular snowcone is $0.05.
How to calculate the volume of a cone?In Mathematics and Geometry, the volume of a cone can be determined by using this formula:
V = 1/3 × πr²h
Where:
V represent the volume of a cone.h represents the height.r represents the radius.By substituting the given parameters into the formula for the volume of a cone, we have the following;
Volume of cone, V = 1/3 × πr²h
Volume of regular snowcone, V = 1/3 × 3.14 × 3² × 6
Volume of regular snowcone, V = 56.52 in³.
For the price per cubic inch, we have:
Price per cubic inch = Cost/Volume
Price per cubic inch = 2.85/56.52
Price per cubic inch = $0.05
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In a tuition centre 70% students have studied Maths and 30% have studied English. If all the students who study English also study Maths and 150 did not study both the subjects, find the number of students who study Maths but not English.
Tyler’s fish tank has 12 orange fish and 4 grey fish. What is the ratio of orange fish to Grey fish
Answer:
12:4
=3:1 (Simplified )
amelia started with $54, and spent $6 each day at camp. she has $18 left.write and solve an equation that can be used to find in how many days, d she has left at camp.which equation can be used to determine how many days d she was at camp?
Amelia was at camp for 6 days. The equation used to determine how many days(D) she was at camp is C x D = 6D and S - (C x D) = E
Given data:
S = initial amount = $54
D = the number of days
C = the cost per day = $6
E: the ending amount = $18
Amelia started with S=$54 and spent C=$6 each day at camp.
Therefore, the total amount she spent at camp is given in an algebraic expression that states the product of two variables:
C x D = 6D
Next, she ended with E=$18. So, the equation can be written in algebraic expression that states the difference between the variable:
S - (C x D) = E
Substituting the values in the equation we get:
54 - 6D = 18
54 - 18 = 6D
36 = 6D
D = 6
Therefore, Amelia was at camp for 6 days.
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