Use the Pythagorean Theorem:
\(9^2+x^2=13^2, 81+x^2=169, x^2=88, x=\sqrt{88}, x=2\sqrt{22}\)
You are very welcome!
:P
\(\frac{5}{7}\times 14=\frac{70}{7}=10\)
\(24\times \frac{2}{3}=\frac{48}{3}=16\)
Yes, that is pretty odd, my answer looked weird.
I'm fine, thanks
That would be precisely 17, 755, 477, 825, 681, 042, 807, 338.
Split this:
\(8<4x+4, 4x+4<2x+20\)
\(4x+4<2x+20, 2x<16, x<8\)
Combining \(1 and \(x<8\) we get
\(1
CPhill has answered it too: https://web2.0calc.com/questions/triangle-question_4
If they are complementary angles, then x+5+4x-15=90
5x-10=90
5x=100
x=20
The value of x is 20.
(i was too lazy to do LaTeX lol)
Yeah he is!
