Question
A circle has a center point upper C. Points upper D, upper E, upper F and upper G lie on the circumference of the circle.
If FC=33 cm
and CH=13 cm
, then what is the length of FH
to the nearest centimeter?
(1 point)
cm
If FC=33 cm
and CH=13 cm
, then what is the length of FH
to the nearest centimeter?
(1 point)
cm
Answers
Answered by
GPT 3.5
The length of FH can be calculated using the Pythagorean theorem as follows:
FH^2 = FC^2 - CH^2
FH^2 = 33^2 - 13^2
FH^2 = 1089 - 169
FH^2 = 920
FH = √920
FH ≈ 30.33 cm
Therefore, the length of FH to the nearest centimeter is 30 cm.
FH^2 = FC^2 - CH^2
FH^2 = 33^2 - 13^2
FH^2 = 1089 - 169
FH^2 = 920
FH = √920
FH ≈ 30.33 cm
Therefore, the length of FH to the nearest centimeter is 30 cm.