Consider the region bounded by the curve y=sin x, the x axis and the line x= π/2. Write integrals for the following... A) the volume obtained when the region is around the x axis. Use x as the integration variable. Evaluate Integral. B) the volume obtained when the region is revolved around the x axis. Use y as integration variable. Do not evaluate. C) the surface area obtained when y=sin x from x=0 to x= π/2 is revolved around the x axis. Use y as integration variable. Do not evaluate.
Consider the region bounded by the curve y=sin x, the x axis and the line x= π/2. Write integrals for the following... A) the volume obtained when the region is around the x axis. Use x as the integration variable. Evaluate Integral. B) the volume obtained when the region is revolved around the x axis. Use y as integration variable. Do not evaluate. C) the surface area obtained when y=sin x from x=0 to x= π/2 is revolved around the x axis. Use y as integration variable. Do not evaluate.
Consider the region bounded by the curve y=sin x, the x axis and the line x= π/2. Write integrals for the following... A) the volume obtained when the region is around the x axis. Use x as the integration variable. Evaluate Integral. B) the volume obtained when the region is revolved around the x axis. Use y as integration variable. Do not evaluate. C) the surface area obtained when y=sin x from x=0 to x= π/2 is revolved around the x axis. Use y as integration variable. Do not evaluate.
Consider the region bounded by the curve y=sin x, the x axis and the line x= π/2. Write integrals for the following...
A) the volume obtained when the region is around the x axis. Use x as the integration variable. Evaluate Integral.
B) the volume obtained when the region is revolved around the x axis. Use y as integration variable. Do not evaluate.
C) the surface area obtained when y=sin x from x=0 to x= π/2 is revolved around the x axis. Use y as integration variable. Do not evaluate.
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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