Answer:
k = -8
Step-by-step explanation:
Given both functions, y = k - x² and y = - 6x + 1. A line tangent to the graph means that the line has one common point with the curve. Therefore, the steps to solve this problem are:
[tex] \displaystyle{k - {x}^{2} = - 6x + 1}[/tex]
Arrange in quadratic terms:
[tex] \displaystyle{ {x}^{2} - 6x + 1 - k = 0}[/tex]
Apply discriminant where b = -6, a = 1 and c = 1-k:
[tex] \displaystyle{ {b}^{2} - 4ac = 0} \\ \\ \displaystyle{ {6}^{2} - 4(1)(1 - k) = 0} \\ \\ \displaystyle{ 36 - 4(1 - k)= 0} \\ \\ \displaystyle{ 36 - 4 + 4k = 0} \\ \\ \displaystyle{ 32 + 4k = 0} \\ \\ \displaystyle{4k = - 32} \\ \\ \displaystyle{k = - 8}[/tex]
Therefore the value of k that makes line tangent to the curve is -8.
