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Determine the value of K that will cause f(x)=Kx^2+4x-3 to intersect the line g(x)=2x-7 at one point. SHOW ALL YOUR STEPS, DON'T USE DECIMALS INSTEAD USE FRACTIONS PLEASE!!!!!

User Ccot
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1 Answer

5 votes
5 votes

Given:

The function are:


f(x)=Kx^2+4x-3


g(x)=2x-7

The graph of f(x) intersect the line g(x) at one point.

To find:

The value of K.

Solution:

The graph of f(x) intersect the line g(x) at one point. It means the line g(x) is the tangent line.

We have,


f(x)=Kx^2+4x-3

Differentiate this function with respect to x.


f'(x)=K(2x)+4(1)-(0)


f'(x)=2Kx+4

Let the point of tangency is
(x_0,y_0). So, the slope of the tangent line is:


[f'(x)]_((x_0,y_0))=2Kx_0+4

On comparing
g(x)=2x-7 with slope-intercept form, we get


m=2

So, the slope of the tangent line is 2.


2Kx_0+4=2


2Kx_0=2-4


x_0=(-2)/(2K)


x_0=-(1)/(K)

Putting
x=x_0,g(x)=y_0 in g(x), we get


y_0=2x_0-7

Putting
x=-(1)/(K) in the above equation, we get


y_0=2(-(1)/(K))-7


y_0=-(2)/(K)-7

Putting
x=-(1)/(K) and
f(x)=-(2)/(K)-7 in f(x).


-(2)/(K)-7=K\left(-(1)/(K)\right)^2+4(-(1)/(K))-3


-(2)/(K)-7=(1)/(K)-(4)/(K)-3


-(2)/(K)-7=(-3)/(K)-3

Multiply both sides by K.


-2-7K=-3-3K


-2+3=7K-3k


1=4k


(1)/(4)=K

Therefore, the value of K is
(1)/(4).

User Pavarine
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2.9k points