Asked by Tyler
Use geometry to evaluate the integral from negative 3 to 3 of f of x, dx for f of x equals the square root of the quantity 4 minus the square of the quantity x plus 1 for x is between negative 3 and 1 including negative 3 and 1, and equals the absolute value of the quantity (x minus 2) minus 1 for x is greater than 1 and less than or equal to 3.
Answers
Answered by
Steve
If I read all those words correctly, you mean
∫[-3,3] f(x) dx
where
f(x) =
f1: √(4-√(x+1)) for -3 <= x <= 1
f2: |x-2|-1 for 1<x<3
Unfortunately, for x < -1 the first piece is complex, not real.
Anyway, fix the presumed typo and just plug in the pieces
∫[-3,1] f1(x) dx + ∫[1,3] f2(x) dx
∫[-3,3] f(x) dx
where
f(x) =
f1: √(4-√(x+1)) for -3 <= x <= 1
f2: |x-2|-1 for 1<x<3
Unfortunately, for x < -1 the first piece is complex, not real.
Anyway, fix the presumed typo and just plug in the pieces
∫[-3,1] f1(x) dx + ∫[1,3] f2(x) dx
Answered by
Sarah
2pi-1
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