Step 3: Find the intersection points ofy=(x+1)2andy=14 Set(x+1)2=14: x+1=12orx+1=−12 This gives: x=−12andx=−32 Step 4: Determine the area between the curves The area we want to find is bounded by the curves fromx=−12tox=32. ...
the area bounded by the curve y=x^2 and the line y=4 generate various solids of revolution when rotated as follows1.about the line y=42. about the y-axis3.about the x-axis 扫码下载作业帮搜索答疑一搜即得 答案解析 查看更多优质解析 解答一 举报 题目:由曲线y=x²和直线y=4围成的区域...
帮我解一道英语的数学题the area bounded by the curve y=x^2 and the line y=4 generate various solids of revolution when rotated as follows1.about the line y=42. about the y-axis3.about the x-axis
关下 帮我解一道英语的数学题关下 关下 the area bounded by the curve y=x^2 and the line y=4 generate various solids of revolution when rotated as follows关下 关下 1.about the line y=4关下 关下 2. about the y-axis关下 关下 3.about the x-axis关下...
Area Bounded by Polar Curves Main Concept For polar curves of the form , the area bounded by the curve and the rays and can be calculated using an integral. Calculating the Area Bounded by the Curve The area of a sector of a circle with radius r and...
百度试题 结果1 题目Find the area bounded by the curve defined by x=2cos t and y=3sin t from t=0 to t=π . 相关知识点: 试题来源: 解析 3π 反馈 收藏
Find the area bounded by the curves y=2x−x2 and the straight line y=−x. View Solution Find the area bounded by the curve y=2x−x2 and the straight line y=−x View Solution Knowledge Check The area bounded by the curves y=ex,y=e−x and y=2, is Alog(16e) Blog(4/e...
Q. The area bounded by the curve y = 4x − x2 and the x-axis is (a) 307sq. units (b) 317sq. units (c) 323sq. units (d) 343sq. units Q. Area of the region bounded by the curve y=cosx, x=0, and x=π is Q. The area of the region bounded bu the curve ...
Find the area bounded by the curve {eq}y = xe^{-x} {/eq}, the {eq}x {/eq}-axis, and the lines {eq}x = 0 {/eq} and {eq}x = 7 {/eq}. Definite Integrals: The area under the curve that is above the x-axis, is found using the definite integral...
find the solid volume of area bounded by the curve y=x^2 and the line y=4 generates rotated by y-axis~It is a calucus problem.V = integration symbol(0 to 4) A(y)dy = integration symbol(0 to 4) pi * y^(1/2) dy = 2/3 pi * y^(3/2) ](0 to 4) = 16/3 pi - 0...