If x = a cos³ θ and y = b sin³ θ, then is equal to : 1. a 2. b 3. 1 4. 2

Given, x = a cos3 θ and y = b sin3 θ Add the expressions, = cos2 θ + sin2 θ = 1 Hence, option 3 is the correct option.

Mathematics

If x = a cos³ θ and y = b sin³ θ, then $\Big(\dfrac{x}{a}\Big)^{\dfrac{2}{3}} + \Big(\dfrac{y}{b}\Big)^{\dfrac{2}{3}}$ is equal to :
a
b
1
2

Trigonometric Identities

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Answer

Given,

x = a cos³ θ and y = b sin³ θ

$\Rightarrow \dfrac{x}{a} = \cos^3 θ \\[1em] \Rightarrow \Big(\dfrac{x}{a}\Big)^{\dfrac{2}{3}} = \cos^2 θ \\[1em] \Rightarrow \dfrac{y}{b} = \sin^3 θ \\[1em] \Rightarrow \Big(\dfrac{y}{b}\Big)^{\dfrac{2}{3}} = \sin^2 θ$

Add the expressions,

$\Big(\dfrac{x}{a}\Big)^{\dfrac{2}{3}} + \Big(\dfrac{y}{b}\Big)^{\dfrac{2}{3}}$ = cos² θ + sin² θ

$\Big(\dfrac{x}{a}\Big)^{\dfrac{2}{3}} + \Big(\dfrac{y}{b}\Big)^{\dfrac{2}{3}}$ = 1

Hence, option 3 is the correct option.

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Mathematics

If x = a cos³ θ and y = b sin³ θ, then $\Big(\dfrac{x}{a}\Big)^{\dfrac{2}{3}} + \Big(\dfrac{y}{b}\Big)^{\dfrac{2}{3}}$ is equal to :
a
b
1
2

Trigonometric Identities

Answer

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Mathematics

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Trigonometric Identities

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The expression equivalent to sec2 θ + cosec2 θ is :sec2 θ · cosec2 θtan2 θ + cot2 θ1sec⁡2θ×cosec⁡2θ\dfrac{1}{\sec^2 θ \times \cosec^2 θ}sec2θ×cosec2θ1​2 sec2 θ + 1

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If x = a cos³ θ and y = b sin³ θ, then $\Big(\dfrac{x}{a}\Big)^{\dfrac{2}{3}} + \Big(\dfrac{y}{b}\Big)^{\dfrac{2}{3}}$ is equal to :
a
b
1
2

If a cot θ + b cosec θ = p and b cot θ + a cosec θ = q, then p² − q² is equal to :
a² − b²
b² − a²
a² + b²
b − a

The expression equivalent to sec² θ + cosec² θ is :
sec² θ · cosec² θ
tan² θ + cot² θ
$\dfrac{1}{\sec^2 θ \times \cosec^2 θ}$
2 sec² θ + 1

If sin θ + cosec θ = 2, then sin³ θ + cosec³ θ is equal to :
2
2 sin θ
−2 sin θ
2 cos θ

The expression equivalent to sec x, is :
$\tan x + \dfrac{\sin x}{\sec x}$
$\cos x + \dfrac{\tan x}{\cos x}$
cos x + tan x sin x
tan x − cos x sin x