The area bounded by the curve x=acos3t,y=asin3t is
A
3πa28
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B
3πa216
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C
3πa232
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D
3πa2
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Solution
The correct option is A3πa28 Eliminating t, we have x2/3+y2/3=a2/3 x=0⇒y=±a y=0⇒x=±a
Symmetric about both the axis
Required area A=4a∫0ydx
Using y=asin3t,x=acos3t, we get ⇒dx=−3acos2tsintdt
Therefore, A=40∫π/2asin3t(−3acos2tsint)dt⇒A=12a2π/2∫0sin4t⋅cos2tdt
Putting t→π2−t, we get ⇒A=12a2π/2∫0cos4t⋅sin2tdt
Adding both, we get ⇒A=6a2π/2∫0(cos4t⋅sin2t+sin4t⋅cos2t)dt⇒A=6a2π/2∫0sin2tcos2tdt⇒A=3a22π/2∫0sin22tdt⇒A=3a22π/4∫02sin22tdt⇒A=3a22π/4∫0(1−cos4t)dt⇒A=3a22[t−sin4t4]π/40∴A=3πa28