It d over 3 u 2 text me if you need more help hope this helps u a little bit more.
Answer:
You would use tangent/toa
Step-by-step explanation:
Because at each point you have to find, you have the info for the opposite and the adjacent
The average hockey player makes per game is an amount of $34,000.00 which is the correct option would be option (A).
<h3>What is the division operation?</h3>
In mathematics, divides left-hand operands into right-hand operands in the division operation. The primary purpose of the division is to generate equal groupings or to determine how many people are in each category after a fair distribution.
For example 4/2 = 2
The average professional hockey player makes $2.78 million a year.
$2.78 million = $2,780,000
They play an average of 82 games.
The average hockey player makes per game = 2,780,000 / 82
Apply the division operation to get the answer.
The average hockey player makes per game = 33,902.439
The average hockey player makes per game = $33,900.00
To learn more about the division operation click here :
brainly.com/question/25870256
#SPJ2
The answer is c. 9z^7/y^6
Now cos⁻¹(0.7) is about 45.6°, that's on the first quadrant.
keep in mind that the inverse cosine function has a range of [0, 180°], so any angles it will spit out, will be on either the I quadrant where cosine is positive or the II quadrant, where cosine is negative.
however, 45.6° has a twin, she's at the IV quadrant, where cosine is also positive, and that'd be 360° - 45.6°, or 314.4°.
now, those are the first two, but we have been only working on the [0, 360°] range.... but we can simply go around the circle many times over up to 720° or 72000000000° if we so wish, so let's go just one more time around the circle to find the other fellows.
360° + 45.6° is a full circle and 45.6° more, that will give us the other angle, also in the first quadrant, but after a full cycle, at 405.6°.
then to find her twin on the IV quadrant, we simply keep on going, and that'd be at 360° + 360° - 45.6°, 674.4°.
and you can keep on going around the circle, but only four are needed this time only.