Asked by tiffany
using limits...finding the tangent line of the square root of x when x=2
Answers
Answered by
Steve
Recall that at any point (x,y) on the graph, the tangent line has slope y'
y = sqrt(x)
y' = 1/(2sqrt(x))
y'(2) = 1/(2sqrt2) = 0.35
So, now we have a point (2,sqrt2) and a slope 1/(2sqrt2)
The point-slope form of the equation gives
y-sqrt2 = 1/(2sqrt2) * (x-2)
If you want the usual slope-intercept form, rearrange stuff to get
y = 1/(2sqrt2)x + 1/sqrt2
y = sqrt(x)
y' = 1/(2sqrt(x))
y'(2) = 1/(2sqrt2) = 0.35
So, now we have a point (2,sqrt2) and a slope 1/(2sqrt2)
The point-slope form of the equation gives
y-sqrt2 = 1/(2sqrt2) * (x-2)
If you want the usual slope-intercept form, rearrange stuff to get
y = 1/(2sqrt2)x + 1/sqrt2
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