Divide -72 by -4 then divide the quotient by -9. What is the final quotient?
To find the quotient of 100 * 5 * -10, we need to perform the multiplication in the given order.
First, we multiply 100 and 5:
100 * 5 = 500
Next, we multiply the result (500) by -10:
500 * -10 = -5000
Therefore, the quotient of 100 * 5 * -10 is -5000.
use long division to convert 2 2/16 to a decimal
2.2857
2.716
0.4375
2.4375
To solve this problem, we need to perform the operations in the given order.
First, we divide -72 by -4:
-72 ÷ -4 = 18
Next, we divide the quotient (18) by -9:
18 ÷ -9 = -2
Therefore, the final quotient is -2.
What is the quotient of 100*5*-10
-50
2
-2
-200
To convert 2 2/16 to a decimal using long division, we can proceed as follows:
2
________
16 | 2.00
- 16
40
- 32
80
- 80
0
The remainder is 0, indicating that the division is exact.
Therefore, 2 2/16 can be represented as the decimal 2.00.
Thus, none of the options provided (2.2857, 2.716, 0.4375, 2.4375) is correct.
use long division to convert 2 7/16 to a decimal
2.2857
2.716
0.4375
2.4375
To convert 2 7/16 to a decimal using long division, we can proceed as follows:
0.4375
-----------------
16 | 2. 7 0 0 0 0 0 0
- 16
110
- 96
140
- 128
120
- 112
80
- 80
0
The remainder is 0, indicating that the division is exact.
Therefore, 2 7/16 can be represented as the decimal 2.4375.
Thus, the correct option is 2.4375.
use long division to convert 6 7/15 to a decimal
6.47
6.14285
6.715
0.46
To convert 6 7/15 to a decimal using long division, we can proceed as follows:
0.4666...
-----------------
15 | 6. 7 0 0 0 0 0 0
- 60
170
- 165
50
- 45
50
- 45
50
- 45
50
...
The division continues indefinitely after the decimal point, indicating that it is a recurring decimal.
Therefore, 6 7/15 can be represented as the decimal 6.4666...
Thus, none of the options provided (6.47, 6.14285, 6.715, 0.46) is correct.
5/1*1/15
To multiply fractions, we need to multiply the numerators together and multiply the denominators together.
So, 5/1 * 1/15 = (5 * 1) / (1 * 15) = 5/15.
However, we can simplify the fraction by finding the greatest common divisor (GCD) of the numerator and denominator, which in this case is 5. Dividing both numerator and denominator by 5, we get:
5/15 = (5 ÷ 5) / (15 ÷ 5) = 1/3.
Therefore, 5/1 * 1/15 is equal to 1/3.
1/3*5/1
To multiply fractions, we multiply the numerators together and multiply the denominators together:
1/3 * 5/1 = (1 * 5) / (3 * 1) = 5/3.
Therefore, 1/3 * 5/1 is equal to 5/3.
7/5*4/3
To multiply fractions, we multiply the numerators together and multiply the denominators together:
7/5 * 4/3 = (7 * 4) / (5 * 3) = 28/15.
Therefore, 7/5 * 4/3 is equal to 28/15.
28/15*7/15
To multiply fractions, we multiply the numerators together and multiply the denominators together:
28/15 * 7/15 = (28 * 7) / (15 * 15) = 196/225.
Therefore, 28/15 * 7/15 is equal to 196/225.
196/225*-4
To multiply a fraction by a whole number, we multiply the numerator of the fraction by the whole number.
196/225 * -4 = (196 * -4) / 225 = -784/225.
Therefore, 196/225 * -4 is equal to -784/225.
5/15*3/4
To multiply fractions, we multiply the numerators together and multiply the denominators together:
5/15 * 3/4 = (5 * 3) / (15 * 4) = 15/60.
However, we can simplify the fraction by finding the greatest common divisor (GCD) of the numerator and denominator, which in this case is 15. Dividing both numerator and denominator by 15, we get:
15/60 = (15 ÷ 15) / (60 ÷ 15) = 1/4.
Therefore, 5/15 * 3/4 is equal to 1/4.