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Question

Let P(h,k) be a point on the curve y=x2+7x+2, nearest to the line, y=3x-3. Then the equation of the normal to the curve at P is


A

x+3y-62=0

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B

x-3y-11=0

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C

x-3y+22=0

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D

x+3y+26=0

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Solution

The correct option is D

x+3y+26=0


Explanation for the correct answer:

Step:1 Finding the coordinates of point P

Given: Curve y=x2+7x+2, line y=3x-3.

Let L be the common normal to parabola y=x2+7x+2and line y=3x3

Therefore slope of tangent of y=x2+7x+2 at P=3

Differentiate w,r. to x

2x+7=32x=-4x=2

Substituting value of x in y=x2+7x+2 ,we get ;

y=x2+7x+2y=4-14+2y=-8

Step:2 Finding Slope of Normal

Since slope of tangent at P is 3 and Normal and tangents areperpendicular to each other so, If m is the slope of normal then

m×3=-1m=-13 since product of slope of two perpendicular lines is minus one.

Step:3 Finding equation of Normal

General equation of line is y=mx+c since slope of normal is m=-13 and it passes through point P (-2,-8) so,

-8=-2(-13)+cc=-263

So, Equation of normal becomes

x+3y+26=0

Hence the correct option is (D).


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