If 2x+2y=2x+y, then (dy/dx) is equal to

Question

If 2x+2y=2x+y, then (dy/dx) is equal to (A)  ((2x+2y)/(2x-2y))  (B)  ((2x+2y)/(1+2x+y))  (C)  2x-y( (2y-1/1-2x) )  (D)  (2x+y-2x/2y)

Tardigrade Admin · Accepted Answer

Given 2x+2y=2x+y On differentiating w.r.t. x, we get 2x log e2+2y log e(dy/dx) =2x+y log e2( 1+(dy/dx) ) ⇒ (dy/dx)(2y log e2-2x+y log e2) =2x+y log e2(1-2x) ⇒ (dy/dx)=[2y log e2(1-2x)] =2x log e2[2y-1] ⇒ (dy/dx)=(2x/2y)(2y-1/1-2x)=2x-y( (2y-1/1-2x) )

Q. If $2^{x} + 2^{y} = 2^{x + y},$ then $\frac{d y}{d x}$ is equal to

$\frac{( 2 ^{x} + 2 ^{y} )}{( 2 ^{x} - 2 ^{y} )}$

$\frac{( 2 ^{x} + 2 ^{y} )}{( 1 + 2 ^{x + y} )}$

$2^{x - y} (\frac{2 ^{y} - 1}{1 - 2 ^{x}})$

$\frac{2 ^{x + y} - 2 ^{x}}{2 ^{y}}$

Q. If 2x+2y=2x+y, then dxdy​ is equal to

(2x−2y)(2x+2y)​

(1+2x+y)(2x+2y)​

2x−y(1−2x2y−1​)

2y2x+y−2x​

Given 2x+2y=2x+y On differentiating w.r.t. x, we get 2xloge​2+2yloge​dxdy​ =2x+yloge​2(1+dxdy​) ⇒ dxdy​(2yloge​2−2x+yloge​2) =2x+yloge​2(1−2x) ⇒ dxdy​=[2yloge​2(1−2x)] =2xloge​2[2y−1] ⇒ dxdy​=2y2x​1−2x2y−1​=2x−y(1−2x2y−1​)

Q. If $2^{x} + 2^{y} = 2^{x + y},$ then $\frac{d y}{d x}$ is equal to

$\frac{( 2 ^{x} + 2 ^{y} )}{( 2 ^{x} - 2 ^{y} )}$

$\frac{( 2 ^{x} + 2 ^{y} )}{( 1 + 2 ^{x + y} )}$

$2^{x - y} (\frac{2 ^{y} - 1}{1 - 2 ^{x}})$

$\frac{2 ^{x + y} - 2 ^{x}}{2 ^{y}}$