Use the properties of operations and rules for multiplying and dividing to solve:
(−35)×(516)×(712)÷(−316)×(−57)
Use the properties of operations and rules for multiplying and dividing to solve:
(−3/5)×(5/16)×(7/12)÷(−3/16)×(−5/7)
what is it
How many ounces are in 12 of 15 of a 10-ounce block of cheese?
To solve the given expression: (-35) × (516) × (712) ÷ (-316) × (-57), you can follow the order of operations, which states that you should perform the multiplication and division operations before addition and subtraction.
Step 1: Multiply -35 by 516
-35 × 516 = -18,060
Step 2: Multiply the result from step 1 by 712
-18,060 × 712 = -12,859,520
Step 3: Divide the result from step 2 by -316
-12,859,520 ÷ -316 = 40,730
Step 4: Multiply the result from step 3 by -57
40,730 × -57 = -2,323,710
Therefore, (-35) × (516) × (712) ÷ (-316) × (-57) = -2,323,710.
To solve this expression, we follow the order of operations, which states that we should perform any calculations inside parentheses first, then perform any multiplication or division from left to right, and finally perform any addition or subtraction from left to right.
First, we'll simplify the expression inside the parentheses:
(−35)×(516)×(712)÷(−316)×(−57) = -35 × 516 × 712 ÷ -316 × -57
Next, we'll perform the multiplication and division from left to right:
= -18,060,960 ÷ -316 × -57
= 57,121 × -57
Finally, we'll perform the final multiplication:
= -3,254,497
Therefore, (-35)×(516)×(712)÷(−316)×(−57) = -3,254,497.
To solve the expression: (−35)×(516)×(712)÷(−316)×(−57), we need to follow the order of operations, which is commonly known as PEMDAS (Parentheses, Exponents, Multiplication and Division, Addition and Subtraction).
Step 1: Perform the multiplications.
(-35) × (516) = -18,060
-18,060 × (712) = -12,839,520
Step 2: Perform the divisions.
-12,839,520 ÷ (-316) = 40,603.2911
40,603.2911 × (-57) = -2,314,203.177
Therefore, the solution to the expression (−35)×(516)×(712)÷(−316)×(−57) is approximately -2,314,203.177.