Answer to Question #196157 in Calculus for Angelo

1.) F = 500 dynes.

"500 = k(24-20)"

"500 = 4k"

"k = \\dfrac{500}{4} = 125"

Hence, "F(x) = 125x"

Therefore, work done can be calculated as,

"W(x) = \\int_{0}^{8}125xdx"

"W(x) = \\dfrac{125\\times 8\\times 8}{2}"

"W = 4000"

2.) We have,

"F = 1200"

We know,

"F = kx"

"1200 = 5.5k"

"k = \\dfrac{1200}{5.5}"

"k = 218.18"

Hence, Work done c an be calculated as,

"W = \\int_{6}^{4.5}218.18xdx"

"W = 109.09[36-20.25]"

"W = 1718.16"

3.) a.)Work done can be calculated as

"Height = 10"

Density of water = 62.4

"\\dfrac{5}{10} = \\dfrac{x}{y}"

"x = \\dfrac{1}{2}y"

Work Done "= \\int_{0}^{10} \\pi x^2dy(62.4)(10-y)"

= "48.94 [333.33-2500]=40783.17"

b.) "Radius = 5ft"

"Height = 10ft"

"\\dfrac{5}{10} = \\dfrac{x}{y}"

"x = \\dfrac{1}{2}y"

Work done can be calculated as:

"= \\int_{0}^{4}\\pi x^2dy(62.4)(10-y)"

"= 48.94[213.33-64] = 7308.21"

4.) Work done can be calculated as

Density of Water "= 1000kg\/m^3"

"Radius = 4m"

"Height = 5m"

Hence,

"\\dfrac{4}{5} = \\dfrac{x}{y}"

"x = \\dfrac{4}{5}y"

Work Done "= \\int_{0}^{5}\\pi x^2dy(1000)(5-y)dy"

"= \\int_{0}^{5}\\pi \\dfrac{16}{25}y^2(1000)(5-y)dy"

"= 2009.6 \\int_{0}^{5}(5y^2-y^3)dy"

"= 2009.6[\\dfrac{5 \\times(5)^3 }{3}-\\dfrac{(5)^4}{4}]"

"= 104659.966J"