I am struggling with the below concepts, please help clarity my doubts:
The answer is relation cannot be determined, however when the perimeter is 50 won’t the area definitively be more than a of a rectangle of perimeter 5?
I am struggling with the below concepts, please help clarity my doubts:
The answer is relation cannot be determined, however when the perimeter is 50 won’t the area definitively be more than a of a rectangle of perimeter 5?
What happens when \theta = 45^{\circ}?
Let the dimensions of the smaller rectangle be (l_1, w_1) = (2.4, 2.6) and the dimensions of the large rectangle be (l_2, w_2) = (49.95, 0.05). How do the areas compare now?
Well, sample SD = population SD only when n \to \infty.
Since a list can only contain a finite number of elements, then \frac{1}{n - 1} > \frac 1n for all n > 1.
Thank you for the reply @cylverixxx,
for the Q1: Do you mean to say when theta = 45, point D is going to be the midpoint of SP and then SP = AC? Then it makes sense but for other angles this is definitely not going to be equal right?
Yes