Hello,
Use the properties of integrals to verify the inequality without evaluating the integral:
pi/6 <= integral of pi/6 to pi/2 of: sinxdx <= pi/3
It looks like I would need to use one of the comparison properties of the integral, but I can't figure out how I would do so. My book does not give any sort of explanation for them. The one that looked promising was:
"If m <= f(x) <= M for a <= x <= b, then:
m(b - a) <= integral from a to b of f(x)dx <= M(b - a)"
I don't know what m and M are or really what the property means.
Any suggestions?
Use the properties of integrals to verify the inequality without evaluating the integral:
pi/6 <= integral of pi/6 to pi/2 of: sinxdx <= pi/3
It looks like I would need to use one of the comparison properties of the integral, but I can't figure out how I would do so. My book does not give any sort of explanation for them. The one that looked promising was:
"If m <= f(x) <= M for a <= x <= b, then:
m(b - a) <= integral from a to b of f(x)dx <= M(b - a)"
I don't know what m and M are or really what the property means.
Any suggestions?