Use the properties of operations and rules for multiplying and dividing to solve:
(−35)×(516)×(712)÷(−316)×(−57)
(1 point)
To solve this expression, we can use the properties of operations and rules for multiplying and dividing.
First, let's simplify the numerator:
(−35)×(516)×(712)÷(−316) = (−35)×(516)×(712)÷(−316)
Second, let's simplify the denominator:
(−316)×(−57) = 18012
Therefore, the expression simplifies to:
(−35)×(516)×(712)÷(−316)×(−57) = (−35)×(516)×(712)÷(18012)
To further simplify this expression, we can cancel out any common factors. However, there are no common factors in this case, so the expression remains:
(−35)×(516)×(712)÷(−316)×(−57) = (−35)×(516)×(712)÷(18012)
So, the expression is (−35)×(516)×(712)÷(18012).
To solve the given expression:
(−35)×(516)×(712)÷(−316)×(−57), we can follow the order of operations (also known as PEMDAS) which states that we need to perform operations within parentheses first, then exponents, followed by multiplication and division (from left to right), and finally addition and subtraction (from left to right).
The given expression does not have any parentheses or exponents, so we can focus on the multiplication and division.
Starting from left to right:
(−35) × (516) = -18,060
-18,060 × (712) = -12,858,720
Next, let's calculate the division:
-12,858,720 ÷ (−316) = 40,707
Finally, we have:
40,707 × (−57) = -2,321,899
Therefore, the result of the given expression is -2,321,899.