ln(x^2-15y)=x-y+5
1/(x^2-15y) * (2x-15y') = 1-y'
2x-15y' = x^2-15y - (x^2-15y)y'
Now just collect terms and solve for y' to get
y' = (x^2-2x-15y)/(x^2-15y-15)
So, at (-4,1) that is
y'(-4) = (16+8-15)/(16-15-15) = -9/14
Finally, using the point-slope form for a line, you have the tangent line as
y-1 = -9/14 (x+4)
If ln(x^2-15y)=x-y+5 and y(-4) by implicit differentation =
Thus the equation of the tangent line to the graph at point (-4,1) is
y=
1 answer
1 answer