The question is to prove "The angle in a semi-circle is a right angle".
Initially, I thought of the locus of a circle, with x-coordinate being acos(theta) and the y-coordinate being asin(theta) (for convenience, theta will be z)
so x = acosz and y = asinz
and cosz = x/a and sinz = y/a
By using the fact that cos^2z + sin^2 z = 1,
(x/a)^2 + (y/a) ^2 = 1
so x^2 + y^2 = a^2
center (0,0), with radius a units.
This is how far I got. I really don't know what to do next. These steps might not even be necessary..
Well anyways, I thought of a semi circle with point P (acosz,asinz).
Gradients don't seem to help, but maybe pythagoras' theorem?
I feel so close to solving it.. any help please?
EDIT: It is probably easier to prove using triangles equal radii, but using what I did, can you prove it from there?
Initially, I thought of the locus of a circle, with x-coordinate being acos(theta) and the y-coordinate being asin(theta) (for convenience, theta will be z)
so x = acosz and y = asinz
and cosz = x/a and sinz = y/a
By using the fact that cos^2z + sin^2 z = 1,
(x/a)^2 + (y/a) ^2 = 1
so x^2 + y^2 = a^2
center (0,0), with radius a units.
This is how far I got. I really don't know what to do next. These steps might not even be necessary..
Well anyways, I thought of a semi circle with point P (acosz,asinz).
Gradients don't seem to help, but maybe pythagoras' theorem?
I feel so close to solving it.. any help please?
EDIT: It is probably easier to prove using triangles equal radii, but using what I did, can you prove it from there?