Consider the graphs of f(x) = x^3 and of g(x) = 1/x^3 . Are the composite functions commutative? Why or why
not?
They are commutative because f(g(1)) = g(f(1)).
They are commutative because the composite
functions both equal x. They are not commutative because the domains of
f(x) and g(x) are different.
They are not commutative because the graphs
intersect each other.

solution:

we have to construct

∠m nt ≅ ∠p qr

the steps to draw this construction are

step 1: use a compass to draw an arc from point q which intersects the side pq at point a and the side qr at point b.

step 2: draw a segment nt and use the same width of the compass to draw an arc from point n which intersects the segment nt at a point x.

step 3:

step 4: join points n and y using a straightedge.

step 3:

option (d).maintaining the same width of the compass as ab, draw an arc from point x such that it intersects the arc drawn from n in a point y.

to draw   congruent angles , 1. width of compasses while drawing two angles should be same i.e from point at which angle has to be drawn, 2.the distance between the two points where the compass intersects the two sides should be same while drawing any two congruent angles.

2425

step-by-step explanation:

idk what the heck he answer is, i’m just putting this here so i finish my account