Let f(x)=sin x a. Estimate the area under the graph of f(x)=sin x from x=0 to x=pi by partitioning the interval into 4 equal subintervals and finding the associated Riemann sum E (b=4 and a= k=1) f(ck) change of xk, using the right hand endpoint of the ach subinterval as ck in the subinterval. Use the Fundamental Theorem of Calculus , Part 2 to evaluate the integral sign (b=pi and a=0) (sin x)dx.
Let f(x)=sin x a. Estimate the area under the graph of f(x)=sin x from x=0 to x=pi by partitioning the interval into 4 equal subintervals and finding the associated Riemann sum E (b=4 and a= k=1) f(ck) change of xk, using the right hand endpoint of the ach subinterval as ck in the subinterval. Use the Fundamental Theorem of Calculus , Part 2 to evaluate the integral sign (b=pi and a=0) (sin x)dx.
Let f(x)=sin x a. Estimate the area under the graph of f(x)=sin x from x=0 to x=pi by partitioning the interval into 4 equal subintervals and finding the associated Riemann sum E (b=4 and a= k=1) f(ck) change of xk, using the right hand endpoint of the ach subinterval as ck in the subinterval. Use the Fundamental Theorem of Calculus , Part 2 to evaluate the integral sign (b=pi and a=0) (sin x)dx.
a. Estimate the area under the graph of f(x)=sin x from x=0 to x=pi by partitioning the interval into 4 equal subintervals and finding the associated Riemann sum E (b=4 and a= k=1) f(ck) change of xk, using the right hand endpoint of the ach subinterval as ck in the subinterval.
Use the Fundamental Theorem of Calculus , Part 2 to evaluate the integral sign (b=pi and a=0) (sin x)dx.
With differentiation, one of the major concepts of calculus. Integration involves the calculation of an integral, which is useful to find many quantities such as areas, volumes, and displacement.
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