<P> If one of the inscribed squares of an acute triangle has side length x and another has side length x with x <x, then </P> <Dl> <Dd> 1 ≥ x a x b ≥ 2 2 3 ≈ 0.94 . (\ displaystyle 1 \ geq (\ frac (x_ (a)) (x_ (b))) \ geq (\ frac (2 (\ sqrt (2))) (3)) \ approx 0.94 .) </Dd> </Dl> <Dd> 1 ≥ x a x b ≥ 2 2 3 ≈ 0.94 . (\ displaystyle 1 \ geq (\ frac (x_ (a)) (x_ (b))) \ geq (\ frac (2 (\ sqrt (2))) (3)) \ approx 0.94 .) </Dd> <P> If two obtuse triangles have sides (a, b, c) and (p, q, r) with c and r being the respective longest sides, then </P>

Can a triangle have two obtuse angle give reason