What is the length of the largest chord which can be drawn in a circle of area 36π square units?
please solve it step by step
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What is the length of the largest chord which can be drawn in a circle of area 36π square units?
please solve it step by step
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Step-by-step explanation:
please solve it step by step
Answer:
12 units
Step-by-step explanation:
The area formula is πr2.
If πr2=36π,
π can be canceled out from both sides.
Then, it is r2=36.
If we square root both sides, we get:
r=6 .
Therefore, the radius of your circle is 6.
now, we know that
largest chord is diameter of the circle
=diameter=2r =12
so length of largest chord =12 units