To solve this expression, we can use the properties of operations and rules for multiplying and dividing.
First, let's simplify the expression by multiplying and dividing the fractions from left to right:
(8/9) × (-3/4) ÷ (1/9) × (-4/5) ÷ (3/5)
= (-24/36) ÷ (1/9) × (-4/5) ÷ (3/5)
= (-24/36) ÷ (1/9) × (-4/5) × (5/3)
= (-24/36) ÷ (1/9) × (-4/3)
= -2/3 × (-4/3)
= 8/9
Therefore, the value of the expression is 8/9.
Use the properties of operations and rules for multiplying and dividing to solve:
(8/9)×(−3/4)÷(1/9)×(−4/5)÷(3/5)
(1 point)
5 answers
Use the properties of operations and rules for multiplying and dividing to solve:
(−3/5)×(5/16)×(7/12)÷(−3/16)×(−5/7)
(−3/5)×(5/16)×(7/12)÷(−3/16)×(−5/7)
To solve this expression, we can use the properties of operations and rules for multiplying and dividing.
(−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7)
First, let's simplify the expression by multiplying and dividing the fractions from left to right:
= (-3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7)
= (-3/5) × (5/16) × (7/12) ÷ (-3/16) × (-5/7)
= (-3/1) × (5/1) × (7/1) ÷ (-3/1) × (-5/1)
= -3 × 5 × 7 ÷ -3 × -5
= -105 ÷ 15
= -7
Therefore, the value of the expression is -7.
(−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7)
First, let's simplify the expression by multiplying and dividing the fractions from left to right:
= (-3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7)
= (-3/5) × (5/16) × (7/12) ÷ (-3/16) × (-5/7)
= (-3/1) × (5/1) × (7/1) ÷ (-3/1) × (-5/1)
= -3 × 5 × 7 ÷ -3 × -5
= -105 ÷ 15
= -7
Therefore, the value of the expression is -7.
Use the properties of operations and rules for multiplying and dividing to solve:
(−35)×(516)×(712)÷(−316)×(−57)
(1 point)
(−35)×(516)×(712)÷(−316)×(−57)
(1 point)
How many ounces are in 1/2 of 1/5 of a 10-ounce block of cheese? (1 point) of
5 answers