How do you integrate $\int \frac{z^{2} + 1}{\sqrt{z}} d z$ $int (z^2+1)/sqrt(z)dz$ ?

Question

How do you integrate $\int \frac{z^{2} + 1}{\sqrt{z}} d z$ $int (z^2+1)/sqrt(z)dz$ ?

2 Answers

Impact of this question

7895 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2015-10-10T19:45:06

I found: $2 (\frac{z^{\frac{5}{2}}}{5} + \sqrt{z}) + c$ $2(z^(5/2)/5+sqrt(z))+c$

Explanation:

Let us set $z = t^{2}$ $z=t^2$ so:
$d z = 2 t d t$ $dz=2tdt$
and substituting:
$=int(t^4+1)/cancel(t)(2cancel(t))dt=$
$2int(t^4+1)dt=2(t^5/5+t)+c=$
back to $z$ :
$=2(z^(5/2)/5+sqrt(z))+c$

Answer 2 · 2015-10-10T20:05:18

$2/5 z^(1/2) ( z^(4/2) +5) + C => 2/5 sqrt(z) (z^2+5)+C$

Explanation:

Separate and simplify the original expression into two parts then integrate each part. Sum the final integrations:

Write $(z^2+1)/(sqrt(z)) " "$ as $" "(z^2)/(z^(1/2)) + 1/(z^(1/2))$

Simplifying the indices giving:

$z^(3/2) + z^(-1/2)$

Now integrate so we have:

$int(z^(3/2)).dz + int(z^(-1/2)).dz$

Giving:

$[ (z^(3/2 +2/2))/(5/2) + C_1 ] + [ (z^(-1/2 + 2/2))/(1/2) + C_2]$

Let $C_1 + C_2 = C_3$ giving:

$2/5 x^(5/2) + 2z^(1/2) + C_3$

But $2/5 z^(1/2) times 5 = 2z^(1/2)$

Factoring out $2/5 z^(1/2)$ gives:

$2/5 sqrt(z) (z^2+5)+C_3$

My copy of Maple used as a check of final solution

Science

Math

Humanities

... and beyond

How do you integrate $\int \frac{z^{2} + 1}{\sqrt{z}} d z$ $int (z^2+1)/sqrt(z)dz$ ?

2 Answers

Explanation:

Explanation:

Related questions

Impact of this question

Science

Math

Humanities

... and beyond

How do you integrate int (z^2+1)/sqrt(z)dz∫z2+1√zdzint (z^2+1)/sqrt(z)dz?

2 Answers

Explanation:

Explanation:

Related questions

Impact of this question

How do you integrate $\int \frac{z^{2} + 1}{\sqrt{z}} d z$ $int (z^2+1)/sqrt(z)dz$ ?