Solve the exponential equation $e^{xy^2}=c$

Step-by-step Solution

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 Solution

 Final answer to the problem

$y=\frac{\sqrt{\ln\left(c\right)}}{\sqrt{x}},\:y=\frac{-\sqrt{\ln\left(c\right)}}{\sqrt{x}}$

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Learn how to solve algebraic expressions problems step by step online. Solve the exponential equation e^(xy^2)=c. We can take out the unknown from the exponent by applying natural logarithm to both sides of the equation. Apply the formula: \ln\left(e^x\right)=x, where x=xy^2. Divide both sides of the equation by x. Removing the variable's exponent.

Final answer to the problem  

$y=\frac{\sqrt{\ln\left(c\right)}}{\sqrt{x}},\:y=\frac{-\sqrt{\ln\left(c\right)}}{\sqrt{x}}$

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 Function Plot

Plotting: $e^{xy^2}-c$

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1

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7

8

9

0



a

b

c

d

f

g

m

n

u

v

w

x

y

z

.

(◻)

+

-

×

◻/◻

/

÷

◻²

◻^◻

√◻

√

^◻√◻

^◻√

∞

e

π

ln

log

log_◻

lim

d/dx

D^□_x

∫

∫^◻

|◻|

θ

=

>

<

>=

<=

sin

cos

tan

cot

sec

csc

asin

acos

atan

acot

asec

acsc

sinh

cosh

tanh

coth

sech

csch

asinh

acosh

atanh

acoth

asech

acsch

Solve the exponential equation $e^{xy^2}=c$

Step-by-step Solution

 Solution

 Final answer to the problem

 Step-by-step Solution  

Create a free account and unlock the first 3 steps of every solution

Also, get 3 free complete solutions daily when you signup with your academic email.

 Final answer to the problem  

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 Function Plot

Plotting: $e^{xy^2}-c$

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