Answer
the value of x is -9 for SR to be perpendicular to TV.
Explanation:
To find the value of x such that line SR is perpendicular to line TV, you can use the fact that two lines are perpendicular when the product of their slopes is -1.
The slope of SR (m_SR) is (2 - (-2)) / (x - 1) = (4) / (x - 1).
The slope of TV (m_TV) is (7 - 2) / (6 - 4) = (5) / (2).
To make SR perpendicular to TV, the product of their slopes should be -1:
m_SR * m_TV = -1.
So, (4 / (x - 1)) * (5 / 2) = -1.
Now, you can solve for x:
(4 / (x - 1)) * (5 / 2) = -1
Multiplying both sides by (2(x - 1)) to eliminate fractions:
4 * 5 = -2(x - 1)
20 = -2(x - 1)
Now, divide by -2 to solve for x:
x - 1 = -10
x = -10 + 1
x = -9