What is the equation of the line normal

Angela Harrell

Angela Harrell

Answered question

2022-04-09

What is the equation of the line normal to f(x)=7x3+9x2 at x=-2?

Answer & Explanation

titemomo8gjz

titemomo8gjz

Beginner2022-04-10Added 10 answers

Gradient of the given equation is it differential
Thus f(x)=21x2+18x
f(2)=21(2)2+18(2)=+48
So the gradient of the line normal to it at this point is:
y=148x+c...(1)
Let the point on the original curve be P1(x1,y1)=(2,y)
f(2)=y1=7(2)3+9(2)2=20
P1(x1,y1)=(2,20)
Substitute these values into equation (1) to find c
Emily Green

Emily Green

Beginner2022-04-11Added 14 answers

f(x)=7x3+9x2 and x0=2
Find the value of the function at the given point: y0=f(2)=92
The slope of the normal line at x=x0 is the negative reciprocal of the derivative of the function, evaluated at x=x0:M(x0)=1f(x0)
Find the derivative: f(x)=(7x3+9x2)=3x(7x+6)
Hence, M(x0)=1f(x0)=13x0(7x0+6)
Next, find the slope at the given point.
m=M(2)=1120
Finally, the equation of the normal line is yy0=m(xx0)
Plugging the found values, we get that y92=x2120
Or, more simply: y=552160x120

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