SOLUTION: The tangent at the point P(a,b) on the curve y=(ab)/x meets the x axis and y axis at Q and R respectively. show that PQ=RP.
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Question 1191761: The tangent at the point P(a,b) on the curve y=(ab)/x meets the x axis and y axis at Q and R respectively. show that PQ=RP.
Answer by greenestamps(13200) (Show Source): You can put this solution on YOUR website!
Here is a diagram with (arbitrarily) (a,b)=(3,8).
The equation of the curve is
The derivative of the function is
The slope of the curve at x=a is the derivative evaluated at x=a:
At this point, to finish the problem, we could do some formal algebra with the point-slope equation of the tangent line to find the x- and y-intercepts and use the distance formula to show that PR=QR.
However, with only a little thought about what we have here, we can see that with a point (3,8) and a tangent at that point with slope (-8/3), moving 3 to the left and 8 up gives us the y-intercept of the tangent line, and moving 3 to the right and down 8 gives us the x-intercept of the tangent line. So the x- and y-intercepts are both the same distance from the point P in both the x- and y-directions, which means the lengths of PQ and PR are equal.
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