Mathematics, 20.09.2020 17:01 avilaaa
In this problem, we will find the volume of a solid with circular base of radius 2, for which parallel cross-sections perpendicular to the base are squares. To do this, we will assume that the base is the circle x2+y2=4, so that the solid lies between planes parallel to the x-axis at x=2 and x=β2. The cross-sections perpendicular to the x-axis are then squares whose bases run from the semicircle y=ββ4βx2 to the semicircle y = β4βx2
Required:
a. What is the area of the cross-section at x?
b. What is the volume of the solid ?
Answers: 2
Mathematics, 21.06.2019 15:00
Need ! give step by step solutions on how to solve number one \frac{9-2\sqrt{3} }{12+\sqrt{3} } number two x+4=\sqrt{13x-20} number three (domain and range) f(x)=2\sqrt[3]{x} +1
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Mathematics, 21.06.2019 18:30
Identify the polynomial. a2b - cd3 a.monomial b.binomial c.trinomial d.four-term polynomial e.five-term polynomial
Answers: 1
In this problem, we will find the volume of a solid with circular base of radius 2, for which parall...
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