Acomputer valued at $6500 depreciates at the rate of 14.3% per year. find the value (round to the nearest dollar) of the computer after three years.

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Acomputer valued at $6500 depreciates at the rate of 14.3% per year. find the value (round to the nearest dollar) of the computer after three years.

4091.25

You can get this number by multiplying by .857, which is the amount remaining after taking off 14.3%. Do this for all 3 years to get the answer above.

the answer is

d.

121π mi^2

hope you got it chief

answer: (c) m∠qpo + (2x + 16)° = 180°

step-by-step explanation:

the opposite angles of a quadrilateral are supplementary.

so, ∠o + ∠q = 180° and ∠p + ∠r = 180°

since ∠r = 2x + 16°, we can use substitution as follows:

∠p + ∠r = 180°

∠p + (2x + 16)° = 180°

After 3 years the computer will be valued at 3711.5. I'm sure you can round it up to 3712.

Hope this helps 🙂

Given that,

Value of a computer= $6500

Depreciation rate= 14.3%

Now, depreciation after 1st year= 6500 x 14.3%

Depreciation after 1st year= 929.5

Value of a computer after 1 year = 6500 – 929.5= 5570.5

Depreciation after 2nd year= 5570.5 x 14.3%

Depreciation after 2nd year= 796.58

Value of the computer after 2 year=5570.5-796.58=4773.92

Depreciation after 3rd year= 4773.92 x 14.3%

Depreciation after 3rd year= 682.67

Value of the computer after 3 year= 4773.92-682.67= 4091.25

Therefore, the value of the computer after 3 year is $4091 approximately.