Math, asked by pandeyvishal63934, 9 months ago

What is the centre of gravity of a semi circle of diameter 12 cm?

Answers

Answered by amitnrw
0

Given : a semi circle of diameter 12 cm

To Find : Center of Gravity

Solution:

Diameter = 12 cm

Radius = 6 cm

Taking center at ( 0 , 0)  and semicircle above x axis

Because of symmetry center of gravity will lie of y axis

\overline{y} = \int\limits^6_0 {\frac{2xy}{A}} \, dy

A = (1/2)πr² =   (1/2)π(6)²  = 18π  cm² ( area of semicircle)

x² + y² = r² =  6²

=> x² = (6² - y²)

=> x = √(36 - y²)

\overline{y}  = \int\limits^6_0 {\frac{2\sqrt{36-y^2} y}{18 \pi}} \, dy

Let assume 36 - y²  = z  

=> -2ydy  = dz

=> 2ydy = -dz  

on substituting  

\int{\frac{-\sqrt{z} }{18 \pi}} \, dz

on integrating

{\dfrac{-z^{\frac{3}{2}} }{\frac{3}{2}.18 \pi}}+c \\{\dfrac{-(36-y^2)^{\frac{3}{2}} }{27 \pi}}+c \\

Applying limits 0 to 6

216/27π

= 8/π  cm

= 2.5465  cm

Hence centre of gravity of a semi circle of diameter 12 cm

will be at a height of 8/π  cm or 2.5465  cm  from the center of Semicircle

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