OpenStudy (danielbarriosr1):
Please help
OpenStudy (anonymous):
What do you need?
OpenStudy (danielbarriosr1):
\[10\sqrt{12x^3}*2\sqrt{6^3}\]
OpenStudy (danielbarriosr1):
\[20\sqrt{72x^6}\]
OpenStudy (danielbarriosr1):
\[20\sqrt{18x^3}*\sqrt{4x^3}\]
OpenStudy (danielbarriosr1):
\[20*9*2\sqrt{x^6}\]
OpenStudy (danielbarriosr1):
\[360\sqrt{x^6}\]
OpenStudy (danielbarriosr1):
What should I do now?
OpenStudy (danielbarriosr1):
@mathmale
OpenStudy (danielbarriosr1):
@ganeshie8
OpenStudy (anonymous):
I'm not very good at these. Sorry.
OpenStudy (danielbarriosr1):
Its ok @_Taterater
OpenStudy (danielbarriosr1):
Someone please help me
ganeshie8 (ganeshie8):
\(\large 10\sqrt{12x^3}*2\sqrt{x^3}\)
ganeshie8 (ganeshie8):
like that ?
OpenStudy (danielbarriosr1):
\[10\sqrt{12x^3}*2\sqrt{6x^3}\]
OpenStudy (danielbarriosr1):
Then I did the other staff and now I have it like this: \[360\sqrt{x^6}\]
ganeshie8 (ganeshie8):
\(\large 10\sqrt{12x^3}*2\sqrt{6x^3}\) \(\large 20\sqrt{12x^3}*\sqrt{6x^3}\)
ganeshie8 (ganeshie8):
Next, notice that \(\large \sqrt{\star} \times \sqrt{\star} = \star\)
ganeshie8 (ganeshie8):
so, \(\large \sqrt{x^3} \times \sqrt{x^3}\) simplifies to \(\large x^3\)
OpenStudy (danielbarriosr1):
oh
ganeshie8 (ganeshie8):
that observation makes ur life easy, instead of putting everything inside radical and trying to simplify stuff
ganeshie8 (ganeshie8):
\(\large 20\sqrt{12x^3}*\sqrt{6x^3}\) becomes : \(\large 20 x^3 \sqrt{12}*\sqrt{6}\)
ganeshie8 (ganeshie8):
see if you're okay wid above
OpenStudy (danielbarriosr1):
I'll try
ganeshie8 (ganeshie8):
good luck !
OpenStudy (danielbarriosr1):
360x^3
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