We have sketched the curve and
marked a point P on the curve with first coordinate x. Since the curve is
y = x2 + 1
the point P has coordinates (x, x2 + 1).
Let s(x) be
the distance between the origin O and the point P. We can then use the
Pythagorean Theorem to calculate the distance OP:
s(x) = [(x2 + (x2 + 1)2 ]1/2 = [x4 + 3 x2 + 1]1/2
x is a function of time t so s(x) is a
function of time and you can differentiate s(x) with respect to t.
d/dt (s(x))
= 1/2 [x4 + 3 x2 + 1]-1/2 (4 x3 dx/dt + 6 x2 dx/dt )
Substitute dx/dt = 2 centimeters per second and you have an expression
that gives you the rate of change of the distance between the origin and an
arbitrary point P on the curve.