87 games is how many he won per year. :)
Cy Young won approximately 23 games per year.
To find out how many games Cy Young won per year, we need to divide the total number of games he won by the number of years he played.
Therefore, we divide 511 (the total number of games he won) by 22 (the number of years he played):
So, Cy Young won approximately 23 games per year.
#SPJ2
Please help!! Answer correctly and no guessing, please!
The first thing you must do is find KL. You use a^2 + b^2 = c^2 to do that.
Then you find the various sines and cosines and Tangents of the angles involved.
Step One
Find KL
a^2 + b^2 = c^2
c = 219
b = 178
a = ??
219^2 = 178^2 + a^2
47061 = 31684 + a^2
a^2 = 48061 - 31684
a^2 = 127.97
Step Two.
Find the sines and cosines of J and L
Choice A
Sin(J) =opposite/hypotenuse = 127/219 = 0.5799
Cos(L) = adjacent/hypotenuse = 127/219 = 0.5799
Conclusion Sin(J) = Cos(L) A is not true. Neither is bigger than the other.
Choice B
Choice B does exactly what Choice A did. The Sin of L is the same thing as the cos(J).
Choice C
C can't be true.
Tan(J) = opposite / Adjacent. = 127/178
Tan(L) = opposite / Adjacent = 178/127
One is larger than 1 and the other one is less than 1. They use the same values but in a different order.
D
We discussed this for choice A. So D is the correct answer
First you need to find out what K and L's angle is
Step #1: Finding L's angle number
to do this you are going to subtract 219-178=?
answer should be 41.
Step #2: Desiding if J is Larger than L
Is 219 Larger than 41? or is 41 larger than 219?