Find the integral $\int\frac{y}{y+1}dy$

Step-by-step Solution

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Final Answer

$y-\ln\left(y+1\right)+C_1$

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Step-by-step Solution

Problem to solve:

$\int\frac{y}{y+1}dy$

Specify the solving method

1

We can solve the integral $\int\frac{y}{y+1}dy$ by applying integration by substitution method (also called U-Substitution). First, we must identify a section within the integral with a new variable (let's call it $u$), which when substituted makes the integral easier. We see that $y+1$ it's a good candidate for substitution. Let's define a variable $u$ and assign it to the choosen part

$u=y+1$

Learn how to solve integrals of rational functions problems step by step online.

$u=y+1$

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Learn how to solve integrals of rational functions problems step by step online. Find the integral int(y/(y+1))dy. We can solve the integral \int\frac{y}{y+1}dy by applying integration by substitution method (also called U-Substitution). First, we must identify a section within the integral with a new variable (let's call it u), which when substituted makes the integral easier. We see that y+1 it's a good candidate for substitution. Let's define a variable u and assign it to the choosen part. Now, in order to rewrite dy in terms of du, we need to find the derivative of u. We need to calculate du, we can do that by deriving the equation above. Rewriting y in terms of u. Substituting u, dy and y in the integral and simplify.

Final Answer

$y-\ln\left(y+1\right)+C_1$

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Go!

1

2

3

4

5

6

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

Find the integral $\int\frac{y}{y+1}dy$

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Solution

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Final Answer

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Final Answer

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Find the integral $\int\frac{y}{y+1}dy$

Step-by-step Solution

Solution

Formulas

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Final Answer

Step-by-step Solution

Unlock the first 3 steps of this solution!

Final Answer

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