1 Answer

Mike Graf · Answer 1 · 2022-03-08T21:28:22+0000

Answer:

$x =\± (2√(6))/(7)$

Explanation:

The question has missing details as the unit circle is not shown, However, I'll solve on a general terms.

Given

P = (x,-(5)/(7))

Required

Determine the possible value of x

Since point p lies on the unit circle, we'll solve this question using the following unit circle formula:

x^2 + y^2 = 1

Substitute -5/7 for y

x^2 + (-(5)/(7))^2 = 1

x^2 + (25)/(49) = 1

Collect Like Terms

x^2 =1- (25)/(49)

Take LCM

x^2 =(49 -25)/(49)

x^2 =(24)/(49)

Take the square root of both sides

$x =\± \sqrt{(24)/(49)}$

$x = \±(√(24))/(7)$

$x = \±(√(4*6))/(7)$

Split

$x = \±(√(4)*√(6))/(7)$

$x =\± (2*√(6))/(7)$

$x =\± (2√(6))/(7)$

Please log in or register to add a comment.