A capital W
it would be a upside down m, because when you rotate 180 degrees you are going halfway. so your figure would be upside down.
u rotated 180 degrees will be upside down and will look like an n. Sometimes answers changes when you say I in a question to be a u. If you are talking about capital I, it will look the same rotated 180 degrees. i will look like an exclamation mark upside down
Turn your computer screen upside down and see for yourself. It looks like 'noh' but the h has a slanted top on it
W 90° = E (anti-clockwise) 180° = W 360° = M
ambigram
Visualize a capital "N." Rotated 90 degrees counter-clockwise (a quarter turn to the left) it would look like a capital "Z."
Numbers that have rotational symmetry are those that look the same after being rotated by certain angles. In the case of single-digit numbers, the numbers 0, 1, and 8 have rotational symmetry. When rotated 180 degrees, 0 and 8 look the same, and when rotated 90 degrees, 1 looks the same. Numbers like 2, 5, and 6 do not have rotational symmetry as they look different when rotated.
A triangle. The effect of turning will depend on whether the plane containing the triangle is rotated - that is, the triangle is rotated around an axis perpendicular to its plane. In that case, it will appear upside down. Alternatively, it can be rotated about an axis in the plane of the triangle. In this case it will appear flipped.
It only has rotional symmetry if it can be rotated around a point less than 360 degrees and staying the same shape like if you rotate a square 90 degrees it will be the same shape as in the beginning.. Kind of confusing
what will the letter Y look like if it is turned 90 degrees to the left
If we are talking about a normal arrow, then no. if " -> " is rotated 90 degrees, it would not look the same as it did before. It would look something like this: ^ | Which would not be the same.
Imagine looking at a clock face. If the hands represented 122 degrees, they would be on 12 & 4.
Oh, what a happy little question! A kite does indeed have rotational symmetry. Just like how you can turn a kite and it still looks the same, it has rotational symmetry. Keep exploring and creating, my friend!