MATHEMATICS HIGH SCHOOL

A catapult launches a boulder with an upward velocity of 112 ft/s. The height of the Boulder, h, in feet after t seconds is given by te function h=-16t^2+112t+30. How long does it take the Boulder to reach its maximum height? What is the Boulder's maximum height ? Round to the nearest hundredth , if necessary . Please , help . I am really stuck here

Answers

Answer 1

Answer:

Answer:

Boulder's maximum height is 226 ft.

It take 3.5 seconds the Boulder to reach its maximum height.

Step-by-step explanation:

Given :

A catapult launches a boulder with an upward velocity of 112 ft/s.

The height of the Boulder, h, in feet

After t seconds is given by the function :

$h = -16t^(2) +112t+30$ --(a)

A quadratic function can be graphed using a table of values. The graph creates a parabola.

If the coefficient of the squared term is positive then the parabola opens up and The vertex of this parabola is known as the minimum point.

If the coefficient of the squared term is negative then the parabola opens down and The vertex of this parabola is known as the maximum point.

Now we will use vertex formula to calculate t

When $f(x)= ax^(2) +bx+c$

then vertex will be

$x=(-b)/(2a)$

Now consider the given function:

$h = -16t^(2) +112t+30$

where a = -16

b=112

so using vertex formula :

$t=(-112)/(2*(-16))$

$t=3.5$

Thus, it take 3.5 seconds the Boulder to reach its maximum height.

Now to calculate the Boulder's maximum height . Put value of t = 3.5 in given function (a)

$h = -16(3.5)^(2) +112(3.5)+30$

$h = -196 +392+30$

$h = 226$

Thus, Boulder's maximum height is 226 ft.

Answer 2

Answer: Well we first need to do the math problem

-b/2a = -112/2(16) = 3.5 s t= 3.5s h = -16t^2 + 112t + 30 h = -16(3.5)^2 +122(3.5) +30 h = 226

adjust the windows to y=300

3.5 s; 226 ft

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Solve for x and y: 3x+7y=22 12x+28y=88

Answers

Final answer:

The system of linear equations 3x + 7y = 22 and 12x + 28y = 88 actually represents the same line, indicating that there are infinite solutions. Any pair of (x, y) that satisfies one equation will satisfy the other.

Explanation:

To solve the system of linear equations 3x + 7y = 22 and 12x + 28y = 88, let's use substitution or elimination method. Here, the elimination method works best since the equations are multiples of each other. Divide the second equation by 4, you get 3x + 7y = 22, which is exactly the same equation as the first equation.

This means both equations represent the same line, so there are infinite solutions. Any x, y that satisfy one equation will satisfy the other. Therefore, the system is dependent.

Example of such solutions (x, y) can be obtained by isolating y in the first equation:

7y = 22 - 3x

y = (22 - 3x) / 7 or y = 9 + 3x

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Final answer:

The given system of equations has infinitely many solutions.

Explanation:

To solve for x and y in the given system of equations:

3x + 7y = 22

12x + 28y = 88

Multiply the first equation by 4 to eliminate the y variable:

12x + 28y = 88

Subtract the second equation from the first equation:

12x + 28y - 12x - 28y = 88 - 88

0 = 0

Since both variables have been eliminated, the equations are dependent and have infinitely many solutions. The solution is any pair of (x, y) values that satisfies the original equations.

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Write a recursive formula for the sequence 8, 10, 12, 14, 16, ... Then find the next term.

Answers

The next term is : an=an-1+2= a1 8; 18

Based on the information given 2 is added ton each sequence

Sequence:

8+2=10

10+2=12

12+2=14

14+2=16

The next term will be:

16+2=8

Inconclusion The next term is an=an-1+2= a1 8; 18

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Answer:

answer is b

Step-by-step explanation:

A number cube is rolled, and a coin is tossed. What is the probability that a four is rolled and the coin comes up tails? A. 1over3, B.1over4, C.1over6, D.1over12

Answers

Probability of a dice rolling a 4 = 1/6
Probability of a coin coming up tails = 1/2

now we multiply the two probabilities together to find what the probability of BOTH occurring at the same time is.
1/6 × 1/2 = 1/12
Answer is D. 1 over 12

Answer:

D. 1/12 is the answer

Step-by-step explanation:

the probability of rolling a 4 is 1/6, and the probability of flipping tails is 1/2. If you multiply 1/2 and 1/6 you get 1/12.

Q: At noon the armadillo left the wild kingdom and headed north at 3 kilometers per hour . two hours later the raccoon left the same kingdom and headed south at 5 kilometers per hour . at what time will the animalse be 38 kilometera apart ?

Answers

Distance of armadillo = V * t = 3t
Distance of racoon = V * (t-2) =5*(t-2)
Distance of armadillo + distance of racoon = 38
3t + 5(t-2)=38
3t + t5 - 10 =38
8t=48
t=6
The anwser is: they will be 38 km apart after 6 hours, so it is 6p.m (12a.m+6 hours)

(2,?) is on the line 4x – 5y = -7. Find the other half of the coordinate.

Answers

this is the work I did

The area of the garden is 13.92 square meters. A fence is planned around the perimeter of the garden. How many meters of fencing are needed?

Answers

The meters of fencing that is needed is = 3.36m

Calculation of needed meters

The garden is designed in a trapezoid form with sides= a; 3.3m and b; 5.28m.

The area of the trapezoid garden = 13.92 m²

Therefore the meters of fencing needed which is height = ?

The formula for the area of trapezoid = A = (a+b/2)h

From the formula make h the subject of formula;

h = A *2/a+b

h = 13.92*2/3.3+5.28

h =27.84/8.28

h= 3.36m

Therefore, the meters of fencing that is needed is = 3.36m.

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Final answer:

The amount of fencing needed is 15.96 m.

Explanation:

To find the amount of fencing needed, we need to calculate the perimeter of the garden. Since the area is given as 13.92 square meters.

The perimeter is the total length of all the sides of the garden added together.

The area of the garden is 13.92 square meters, which means that the garden is a rectangle with a length of 4 meters and a width of 3.48 meters.

Perimeter = 2 * (length + width)

Perimeter = 2 * (4 + 3.48)

Perimeter = 15.96 meters

Therefore, 15.96 meters of fencing are needed.

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