A W-2 shows how much has been earned, and how much has been withheld for taxes.
Answer: x=-5
Step-by-step explanation:
Graph has no y intercept, thus has to be equal to x, and since its -5... x=-5 is your answer
Answer:
sin(θ) = 12/13, cos(θ) = 5/13, tan(θ) = 12/5
Step-by-step explanation:
We need to find sine, cosine, and tangent of theta for this triangle.
First, define the different trigonometric functions:
- sine is opposite side to the angle divided by the hypotenuse (longest side not adjacent to the 90 degree angle)
- cosine is the adjacent side next to the angle divided by the hypotenuse
- tangent is the opposite side to the angle divided by the adjacent side
Now, look at theta (θ):
- the opposite side is marked 12
- the adjacent side is marked 5
- the hypotenuse is marked 13
So:
- sin(θ) = opposite / hypotenuse = 12/13
- cos(θ) = adjacent / hypotenuse = 5/13
- tan(θ) = opposite / adjacent = 12/5
Thus the answers are: sin(θ) = 12/13, cos(θ) = 5/13, tan(θ) = 12/5.
Answer:
C. $538,021.66
Step-by-step explanation:
It is given that the money Seth withdraws was compounded every quarter for 35 years. So, we get,
Amount withdrawn every quarter, P = $4567
Rate of interest, r =
= 0.002525
Time period, n = 35 × 4 = 140
Now, as we know the formula for annuity as,

where P = installments, PV = present value, r = rate of interest and n = time period.
This gives, ![PV=\frac{P \times [1-(1+r)^{-n}]}{r}](https://tex.z-dn.net/?f=PV%3D%5Cfrac%7BP%20%5Ctimes%20%5B1-%281%2Br%29%5E%7B-n%7D%5D%7D%7Br%7D)
i.e. ![PV=\frac{4567 \times [1-(1+0.002525)^{-140}]}{0.002525}](https://tex.z-dn.net/?f=PV%3D%5Cfrac%7B4567%20%5Ctimes%20%5B1-%281%2B0.002525%29%5E%7B-140%7D%5D%7D%7B0.002525%7D)
i.e. ![PV=\frac{4567 \times [1-(1.002525)^{-140}]}{0.002525}](https://tex.z-dn.net/?f=PV%3D%5Cfrac%7B4567%20%5Ctimes%20%5B1-%281.002525%29%5E%7B-140%7D%5D%7D%7B0.002525%7D)
i.e. ![PV=\frac{4567 \times [1-0.7021]}{0.002525}](https://tex.z-dn.net/?f=PV%3D%5Cfrac%7B4567%20%5Ctimes%20%5B1-0.7021%5D%7D%7B0.002525%7D)
i.e. 
i.e. 
i.e. 
So, the closest answer to initial value of the account is $538,021.66
Hence, option C is correct.