calculus
posted by diny .
the base of a solid is the region between the curve y=2 square root of sin x and the interval [0,pi] on the xaxis. the crosssections perpendicular to the xaxis are equilateral triangles with bases running from the xaxis to the curve as shown in the accompanying figure.

km
Respond to this Question
Similar Questions

calculus
The base of a solid is a circle of radius = 4 Find the exact volume of this solid if the cross sections perpendicular to a given axis are equilateral right triangles. I have the area of the triangle (1/2bh) to be equal to 2sqrt(12) … 
Calculus
R is the region in the plane bounded below by the curve y=x^2 and above by the line y=1. (a) Set up and evaluate an integral that gives the area of R. (b) A solid has base R and the crosssections of the solid perpendicular to the … 
Calculus
R is the region in the plane bounded below by the curve y=x^2 and above by the line y=1. (a) Set up and evaluate an integral that gives the area of R. (b) A solid has base R and the crosssections of the solid perpendicular to the … 
Calculus
R is the region in the plane bounded below by the curve y=x^2 and above by the line y=1. (a) Set up and evaluate an integral that gives the area of R. (b) A solid has base R and the crosssections of the solid perpendicular to the … 
Calculus
Find the volume of the solid obtained by rotating the region bounded by y=x^3, y=1, and the yaxis and whose crosssections perpendicular to the y axis are equilateral triangles. I asked this same question for the yaxis around the … 
Calculus
Find the volume of the solid obtained by rotating the region bounded by y=x^3, y=1, and the yaxis and whose crosssections perpendicular to the y axis are equilateral triangles. I asked this same question for the yaxis around the … 
Calculus
Find the volume of the solid obtained by rotating the region bounded by y=x^3, y=1, and the yaxis and whose crosssections perpendicular to the y axis are equilateral triangles. I asked this same question for the yaxis around the … 
calculus
The base of a solid in the xyplane is the firstquadrant region bounded y = x and y = x2. Cross sections of the solid perpendicular to the xaxis are equilateral triangles. What is the volume, in cubic units, of the solid? 
Calculus
Let f and g be the functions given by f(x)=1+sin(2x) and g(x)=e^(x/2). Let R be the shaded region in the first quadrant enclosed by the graphs of f and g. A. The region R is the base of a solid. For this solid, the cross sections, … 
Calculus
The base of a solid in the xyplane is the firstquadrant region bounded y = x and y = x^2. Cross sections of the solid perpendicular to the xaxis are equilateral triangles. What is the volume, in cubic units, of the solid?