\(\quad log(\infty)\\=log(\infty ^{\infty}) \space<--\color{red}\space Note\space that\space infinity\space to\space the\space power\space of\space infinity\space still\space equals\space infinity\space \\\color{red}because\space infinity\space is\space the\space biggest\space number.....\\= \infty \times log({\infty})\\ = \infty\\ \color{red}(It\space is \space because\space everything\space times\space infinity\space equals\space infinity)\)
I did it on the graphing calculator.
https://www.desmos.com/calculator/hntv9qimie
If it's a maths question, it's 19
If it's a joke, it's 21
Btw I don't understand why 9+10 = 21 is a joke. And I am not from America. This is not my fault right? :P
\(2\times \dfrac{2}{5}= \frac{2\times2}{5}=\frac{4}{5}\)
This is not an equation.
Hello guest #2 :D
The name is not important. The more important is what they do inside the baby changing stations......
They don't change the baby inside so they will always come back with the same baby......
\(\frac{x^2+x+3}{2x^2+x-6}\geqslant 0\)
\(x^2+x+3\geqslant 0\)
\(x \geqslant {-1 \pm \sqrt{1^2-4(1)(3)} \over 2(1)}\)
And the right hand side is imaginary.
1(a) $500 x (1+2%)25 x 12
= $500 x 1.0230
= $905.6807920516769
\(\approx\)$ 905.68
This is a trig question.
And there's one information missing. What's the actual distance (not the horizontal distance) from the hoop to the free-throw line?
This isn't a question.
