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Question
If θ is a parameter, find the equation of the locus of a moving point, whose coordinates are x = a cos3θ, y = a sin3θ
Solution
The given moving points is (a cos3θ, a sin3θ)
x = a cos3θ
y = a sin3θ
`x/"a"` = cos3θ
`y/"a"` = sin3θ
cos θ = `(x/"a")^(1/3)`
sin θ = `(y/"a")^(1/3)`
cos2θ + sin2θ = `[(x/"a")^(1/3)]^2 + [(y/"a")^(1/3)]^2`
1 = `(x/"a")^(2/3) + (y/"a")^(2/3)`
1 = `(x^(2/3))/("a"^(2/3)) + (y^(2/3))/("a"^(2/3))`
`x^(2/3) + y^(2/3) = "a"^(2/3)` which is the required locus.
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