\(\sqrt{75}\\=\sqrt{5^2\cdot 3}\\=\sqrt{5^2}\cdot\sqrt{3}\\ = 5\sqrt 3\)
Example: \(32^{0.6} = (\sqrt[5]{32})^3 = 8\)
You usually change it into fraction and calculate using Law of Indices.
This is a question yet not question.
It is located between 'yes' and 'no'
Yea. Confusing. but true.
I use 'stat' as an abbreviation for static
If I am writing static electricity I would write 'stat. ϟ'
Oops sry it was me but I don't wanna fight XD
Changed to +5
Use the base change formula.
Example: Calculate log4 27 using calculator.
\(\log_4(27) = \dfrac{\ln 27}{\ln 4}\text{ and I am too lazy for the calculator}\)
My favourite and only gift this year is a ball of icecream. It is already eaten though XD.
NONONO you can't steal it
~The smartest cookie in the world
\(i = \dfrac{cg}{d}+\dfrac{h}{e}\\ dei = ceg + dh\\ d(ei-h) = ceg\\ d = \dfrac{ceg}{ei-h}\)
YAY! It is my favourite part of Algebra: Solving word equations!!
LOL, a friend!! Yea I am more than happy to accept it :P
Take the arccosine of both sides.
\(\cos A = 1.26\\ \arccos \cos A = \arccos 1.26\\ A = \arccos 1.26\)
I am too lazy for the calculator.
