A right angled triangle has side lengths labeled as so.
However unlike in this diagram $a = b$.
How can $a$ be calculated given $c$?
Would $a = c \cdot d$ where $d$ is a constant?
A right angled triangle has side lengths labeled as so.
However unlike in this diagram $a = b$.
How can $a$ be calculated given $c$?
Would $a = c \cdot d$ where $d$ is a constant?
We know that $c^2 = a^2+b^2$ from Pythagorean Theorem or $c^2 = 2a^2$. Thus $c = a \sqrt{2}$.
If A=B , then the angles of the triangle are 45:45:90, And as per the 45:45:90 theorem, the side opposite the 45 degree angle is hypotenuse/√2
So in this case value of A
will be C/√2