Find dy/dx by implicit differentiation.

(sin pix + cos piy)^8 = 17

dy/dx =

please help quickly

Question

13-07-2022
Mathematics

contestada

Find dy/dx by implicit differentiation.

(sin pix + cos piy)^8 = 17

dy/dx =

please help quickly

Respuesta :

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oladayoademosu oladayoademosu · Answer 1 · 2022-07-14T19:58:44+02:00

dy/dx by implicit differentiation is cos(πx)/sin(πy)

How to find dy/dx by implicit differentiation?

Since we have the equation

(sin(πx) + cos(πy)⁸ = 17, to find dy/dx, we differentiate implicitly.

So, [(sin(πx) + cos(πy)⁸ = 17]

d[(sin(πx) + cos(πy)⁸]/dx = d17/dx

d[(sin(πx) + cos(πy)⁸]/dx = 0

Let sin(πx) + cos(πy) = u

So, du⁸/dx = 0

du⁸/du × du/dx = 0

Since,

du⁸/du = 8u⁷ and

du/dx = d[sin(πx) + cos(πy)]/dx

= dsin(πx)/dx + dcos(πy)/dx

= dsin(πx)/dx + (dcos(πy)/dy × dy/dx)

= πcos(πx) - πsin(πy) × dy/dx

So, du⁸/dx = 0

du⁸/du × du/dx = 0

8u⁷ × [ πcos(πx) - πsin(πy) × dy/dx] = 0

8[(sin(πx) + cos(πy)]⁷ × (πcos(πx) - πsin(πy) × dy/dx) = 0

Since 8[(sin(πx) + cos(πy)]⁷ ≠ 0

(πcos(πx) - πsin(πy) × dy/dx) = 0

πcos(πx) = πsin(πy) × dy/dx

dy/dx = πcos(πx)/πsin(πy)

dy/dx = cos(πx)/sin(πy)

So, dy/dx by implicit differentiation is cos(πx)/sin(πy)

Learn more about implicit differentiation here:

https://brainly.com/question/25081524

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Find dy/dx by implicit differentiation.(sin pix + cos piy)^8 = 17dy/dx = please help quickly

Respuesta :

How to find dy/dx by implicit differentiation?

Otras preguntas

Find dy/dx by implicit differentiation.

(sin pix + cos piy)^8 = 17

dy/dx =

please help quickly