Solve using division of rational numbers, if a car’s value decreases by 4000 in the first 12 months, how much does a valued increase per month round to the nearest hundredth
To find the value increase per month, we need to divide the total value decrease by the number of months.
The value decrease is given as 4000 and the number of months is 12.
Therefore, the value increase per month is:
4000 / 12 = 333.33
Rounding to the nearest hundredth, the value increase per month is approximately 333.33.
To find the value increase per month, we need to divide the decrease in value by the number of months.
Given:
Decrease in value = $4000
Number of months = 12
Value increase per month = Decrease in value divided by the number of months
Value increase per month = $4000 / 12
Calculating the value increase per month:
Value increase per month = $333.33 (rounded to the nearest hundredth)
Therefore, the value increases by approximately $333.33 per month.
To find how much the car's value decreases per month, we can divide the total decrease (4000) by the number of months (12).
Value decrease per month = Total decrease / Number of months
Value decrease per month = 4000 / 12
To perform the division of rational numbers, follow these steps:
1. Divide the numerator (4000) by the denominator (12) using long division.
333
__________
12 | 4000
36
2. Bring down the next digit (0) and continue the long division.
333
__________
12 | 4000
36
------
400
- 396
3. Repeat the process until there are no more digits to bring down.
333
__________
12 | 4000
36
------
400
- 396
------
400
- 396
------
40
4. The division stops when the remainder (40) is less than the divisor (12).
The car's value decreases by approximately 333.33 per month (rounded to the nearest hundredth).