Let us prove that f(\mathbb{R}) is dense in T = S^1 \times S^1 . This will show that f(\mathbb{R}) is not a submanifold of T (since a submanifold S of a manifold M is never ...

Note that \sqrt[4.5]{1296}\equiv1296^{1/4.5}=1296^{2/9}=x and we want to determine what x is. Thus, x^9=1296^2 \implies x^9-1296^2=0 From here, one usually uses root finding algorithms. ...

(a^2+b^2)(c^2+d^2)=u\overline{u}v\overline{v}=uv\overline{uv}=|uv|^2=(ac-bd)^2+(ad+bc)^2=s^2+t^2. Edit: New Question: 493=(4^2+1^2)(5^2+2^2)=(20-2)^2+(8+5)^2=18^2+13^2.

Below is a solution to your problem as I understand it. Your main mistake was that you only considered one threshold when dealing with more than 2 states. For the sake of readability I start with the ...

If you want a number to be a perfect square, all its prime factors must be raise to an even power i.e. b^{2n}. So p = 2*3*5 because 480p=2^6*3^2*5^2 => \sqrt{480p}=\sqrt{2^6*3^2*5^2}=2^3*3*5 ...

HINT: WLOG let a=\tan A, b=\tan B with 0<A,B<90^\circ \dfrac{1+\tan A\tan B}{\sec A\sec B}=\cos(A-B) What if A-B\ge60^\circ say A=80^\circ, B=\cdots