SOLUTION: Please help me solve this equation:
Consider the function {{{ f(x) = e^(-x)/(1-e^-5) }}} {{{ 0<=x<=5 }}}
a) Verify that {{{ int( f(x), dx, 0, 5 ) =1 }}}
b) Find {{{ int ( x f(
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-> SOLUTION: Please help me solve this equation:
Consider the function {{{ f(x) = e^(-x)/(1-e^-5) }}} {{{ 0<=x<=5 }}}
a) Verify that {{{ int( f(x), dx, 0, 5 ) =1 }}}
b) Find {{{ int ( x f(
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For both parts it helps to recognize that the denominator of f(x) is a constant. So we can rewrite the function as:
a) Verify that
We can factor out the constant from the integrand:
Now the integral is easy to find: evaluated from 0 to 5:
since
which simplifies to 1 (since .
b) Find
Again we can factor out the constant:
This integral is a job for Integration by Parts. If u = x and dv = . This makes v = and du = dx. Substituting u and dv we get:
(Technically the boundary values, 0 to 5, change, too. But since I am going to substitute back in for u and v I am not going to spend the time to make this adjustment. You, however, should not skip this step.)
By the rule for Integration by Parts, , we get:
The remaining integral is easy:
Evaluating this from 0 to 5:
If we multiply the numerator and denominator by we get:
(