百度试题 结果1 题目FORMULA: FIND THE VOLUME: 相关知识点: 试题来源: 解析 FORMULA: V=BhFIND THE VOLUME:B=3(4)=18h=6v= 18(6)=109 yd3B=12 (8+4)(3.5)=21h=12v=21(12)=252 m3反馈 收藏
Volume: In this question we are given two functions one is a cubic function other is a linear one. We find the points of intersection by solving the equations. The points of intersection acts as limits of the definite integrals. The formula i...
We can compute the volume of the solid formed by revolution using the cylindrical shell method and its formula is {eq}V=2\pi \int_{a}^{b}rh\:dr {/eq} where {eq}r {/eq} is the centroid of the region, {eq}h {/eq} is the height and {eq}d...
What if you are told the area of one face of a cube? Can you use that information to find the volume? Yes, the area of one face is the face's length times width. Once you find the width or length, you can apply the volume formula:...
The volume of a cone is equal to ( 1/3) times the area of the base(π r^2) times the height( h). ( 1/3⋅ π ⋅ ((radius))^2⋅ (height)) Substitute the values of the radius( r=4) and height( h=9) into the formula to find the volume of the cone. Pi(π...
The volume of a cone is equal to ( 1/3) times the area of the base(π r^2) times the height( h). ( 1/3⋅ π ⋅ ((radius))^2⋅ (height)) Substitute the values of the radius( r=4) and height( h=9) into the formula to find the volume of the cone. Pi(π...
Find the volume formed by rotating about the y-axis the region enclosed by {eq}x=4y {/eq} and {eq}y^3=x {/eq} with respect to {eq}y {/eq}. Solving for Volume: There are several techniques for calculating the volume V of a region bounded by...
Finding the Volume: Let us find the volume of the given solid by using the Washer method revolved around the {eq}x {/eq}- axis. The Volume formula is, {eq}\displaystyle Volume = \int_{x_{1}}^{x_{2}} \pi \left [ \left( f\le...
Volume = (1/3)πr2h is the formula for calculating the volume of a cone.Where,r is the radius of the cone's circular base. The height of the cone is given by h. A cone's volume is one-third that of a cylinder with the same base and height....
Substitute the values of the radius( r=10.5) and height( h=15) into the formula to find the volume of the cone. Pi(π ) is approximately equal to ( 3.14). ( 1/3⋅ π ⋅ (10.5)^2⋅ 15) Combine( 1/3) and ( π ). ( (π )/3⋅ (10.5)^2⋅ 15) Raise ( ...