Dear Sir, very thorough...but waaayyy to fast for me to follow. I do appriciate you taking the time to post.
HotRodStart 1 week ago
...and has the profound implication that neither sin(x) nor cos(x) can ever exceed 1. If either did, then the other would have to yield a negative # for the sums of their squares to equal 1.
jwmmath 1 week ago
squirt?
Rinnertt 2 weeks ago
Dear Sir, very thorough...but waaayyy to fast for me to follow. I do appriciate you taking the time to post.
HotRodStart 1 week ago
...and has the profound implication that neither sin(x) nor cos(x) can ever exceed 1. If either did, then the other would have to yield a negative # for the sums of their squares to equal 1.
jwmmath 1 week ago
squirt?
Rinnertt 2 weeks ago