122 Ordinary Differential EquationsFormulas Involving Curves Defined ParametricallyAreaIf y( x) is a nonnegative, continuous function of x on the interval [ a, b], if x
and y are defined parametrically byx = f(t), y = g(t) for ti ::; t ::; t2
where f(ti) =a and f(t 2 ) = b, and if f'(t) and g(t) are both continuous on
the interval [t 1 , t 2 ], then the definite integral of y(x) on the interval [a, b]- the
area under the curve y(x) over [a, b]- is
l
b 1 t2
y(x)dx = g(t)f'(t)dt.
a tiArc LengthIf a curve is defined parametrically on the interval [a, b] by x = f(t), y = g(t)
for t 1 ::; t ::; t2 where f(t 1 ) = a and f(t2) = b and if f'(t) and g'(t) are
continuous on t he interval [t 1 , t 2 ], then t he arc length of the curve over [a, b]
is1
t2 1 t2
s = ..j(dx/dt)^2 + (dy/dt)^2 dt = J[!'(t)]^2 + [g'(t)]2 dt.
ti t1EXAMPLE 2 Numerical Calculation of Arc Length,
Surface Area, and Volumea. Find the arc length of the semi-circle y(x) = Jg - x^2 over the interval
[l , 2].b. Find the area of the surface generated by revolving the given arc of the
semi-circle over t he interval [l , 2] about the y-axis.c. Find the volume of the solid generated by revolving the region bounded by
the given arc of the semi-circle, the h orizontal line y = J5, and the vertical
line x = 1 about the y-axis.