For #f(x) =-x^3+8x#, what is the equation of the line tangent to #x =1#?

Question

1421 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2015-11-04T04:29:47

#y= 5x -2#

Firstly, you find the slope of the curve, i.e. by derivative,

#dy/dx# = #-3x^2 + 8# is the slope of the tangent.

Now as it is given that you need the find the equation of the tangent at point where #x# = 1,

Slope at #x# =1

= # -3.(1) ^2# + 8
= 5

Now you have got the slope and you need a point where this tangent passes through.
Now see, at #x=1# , the curve and the tangent meet.

So you can replace this #x# in the equation to get the value of #y#.

SO,

y=-1 + 8 = 7

So, the curve and the tangent both pass through ( 1,7).

Now equation of the tangent passing through (1,7 ) and with slope m= 5,

#(y-y1)=m(x-x1)#

#(y-7) = 5(x-1)#

#y-7 = 5x -5#

So,

#y= 5x -2# is the equation go the tangent of the given curve at x= 1