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I don’t know why I have to write the picture has the problem but please help.

I don’t know why I have to write the picture has the problem but please help.-example-1
User Ivo Coumans
by
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1 Answer

7 votes
7 votes

Answer and Step-by-step explanation:

1. Find the side lengths of a square with an area of
(169)/(225) cm^(2).

What we know:

- The area of the square.

- The formula for the area of a square. Side times (multiply by) Side, which is also Side Squared
({S}^2).

Set the area equal to
({S}^2).


{S}^2 = (169)/(225)

Take the square root of both sides of the equation to get S (Side).


\sqrt{{S}^2} = \sqrt{ (169)/(225)} \\\\S = (√(169) )/(√(225) ) \\\\S = (13)/(15)cm<-- This is your answer.

2. Find the radius (distance from a point on the circle to the center of the circle) of a circle using the area 121
\pi yd^2

What we know:

- The area of a circle.

- The formula for the area of a circle.
\pi r^2

Set the area equal to
\pi r^2.


\pi r^2 = 121\pi

Divide pi
(\pi ) from both sides of the equation.


r^2 = 121

Take the square root of both sides of the equation.


√(r^2) = √(121) \\\\r = 11<-- This is your answer.

3. Find the area of the circular flower garden.

What we know:

- Area of the plot of land: 144

What we can find:

- The side length of a square.

- The radius of a circle.

- The area of a circle.

First, find the side length of the square.


S^2 = 144\\\\

Take the square root of both sides of the equation.


√(S^2) = √(144) \\\\S = 12

In this case, the side length of a square will also be the diameter of a circle.

To find the radius, divide the diameter by 2.


(12)/(2) = 6 = r

Finally, plug this value into the area of a circle formula and solve.


\pi r^2\\\\\(3.14) (6)^2\\\\36(3.14) = 113.04cm^2 <- This is your answer.

#teamtrees #PAW (Plant And Water)

I hope this helps!

User John Bargman
by
2.2k points