Use the properties of operations and rules for multiplying and dividing to solve:
(−3)÷(34)×(27)×(−516)÷(57)
Use the properties of operations and rules for multiplying and dividing to solve: (−3/5)×(5/16)×(7/12)÷(−3/16)×(−5/7)
To solve this expression, we need to use the properties of operations and rules for multiplying and dividing. Let's go step by step:
First, let's multiply the numbers in the numerator: (−3) × 27 × (−516) = 41,724.
Next, let's multiply the numbers in the denominator: 34 × 57 = 1,938.
Lastly, let's divide the numerator by the denominator: 41,724 ÷ 1,938 = 21.528.
Therefore, (−3) ÷ (34) × 27 × (−516) ÷ (57) equals approximately 21.528.
Use the properties of operations and rules for multiplying and dividing to solve:
(−3)÷(3/4)×(2/7)×(−5/16)÷(5/7)
To solve this expression, we need to use the properties of operations and rules for multiplying and dividing. Let's go step by step:
First, let's divide the numerator by the denominator in the first fraction: (−3) ÷ (3/4) = (−3) × (4/3) = −12/3 = −4.
Next, let's multiply the fractions together: −4 × (2/7) × (−5/16) × (5/7) = (−4) × (2/7) × (−5/16) × (5/7) = (−40/112) = −10/28 = −5/14.
Therefore, (−3) ÷ (3/4) × (2/7) × (−5/16) ÷ (5/7) equals −5/14.
Apologies for the mistake. Let's try solving the expression again:
To solve: (−3) ÷ (3/4) × (2/7) × (−5/16) ÷ (5/7)
First, let's simplify the division: (−3) ÷ (3/4) can be rewritten as (−3) × (4/3) = −12/3 = −4.
Next, let's multiply the fractions: −4 × (2/7) × (−5/16) = (−4) × (2/7) × (−5/16) = (−40/112) = −5/14.
Lastly, let's divide (-5/14) by (5/7): (-5/14) ÷ (5/7) = (-5/14) × (7/5) = (-35/70) = -1/2.
Therefore, (−3) ÷ (3/4) × (2/7) × (−5/16) ÷ (5/7) equals -1/2.
still wrong
I apologize for the continued errors. Let's try solving the expression again:
To solve: (−3) ÷ (3/4) × (2/7) × (−5/16) ÷ (5/7)
First, let's simplify the division: (−3) ÷ (3/4) can be rewritten as (−3) × (4/3) = −12/3 = −4.
Now, let's multiply the fractions: (−4) × (2/7) × (−5/16) = (−4) × (2/7) × (−5/16) = 40/448 = 5/56.
Finally, let's divide (5/56) by (5/7): (5/56) ÷ (5/7) = (5/56) × (7/5) = 35/280 = 1/8.
Therefore, (−3) ÷ (3/4) × (2/7) × (−5/16) ÷ (5/7) equals 1/8.
it's still wrong
Apologies for the continued mistakes. Let's try solving the expression once again:
To solve: (−3) ÷ (3/4) × (2/7) × (−5/16) ÷ (5/7)
First, let's simplify the division: (−3) ÷ (3/4) can be rewritten as (−3) × (4/3) = -12/3 = -4.
Next, let's multiply the fractions: -4 × (2/7) × (−5/16) = (-4) × (2/7) × (-5/16) = 40/112 = 5/14.
Finally, let's divide (5/14) by (5/7): (5/14) ÷ (5/7) = (5/14) × (7/5) = 35/70 = 1/2.
Therefore, (−3) ÷ (3/4) × (2/7) × (−5/16) ÷ (5/7) equals 1/2.
ty
You're welcome! If you have any more questions, feel free to ask.
To solve this expression, we need to use the properties of operations and rules for multiplying and dividing. Let's go step by step:
First, let's multiply the fractions together: (−3/5) × (5/16) × (7/12) × (−3/16) × (−5/7).
Multiplying the numerators and denominators gives us: (−3 × 5 × 7 × −3 × −5) / (5 × 16 × 12 × 16 × 7).
This simplifies to: (225/28 × 48 × 7).
Further simplifying gives us: (225/28 × 48/1 × 7/1).
Multiplying these fractions gives us: 75/4 × 7.
This simplifies to: 525/4.
Therefore, (−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7) equals 525/4.
it's wrong
Apologies for the mistake. Let's try solving the expression again:
To solve: (−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7)
First, let's simplify the multiplication: (−3/5) × (5/16) × (7/12) = (-3 × 5 × 7) / (5 × 16 × 12) = (-105) / (960).
Next, let's simplify the division: (-105/960) ÷ (−3/16) × (−5/7) = (-105/960) ÷ (-3/16) × (-5/7) = (-105/960) × (16/-3) × (-5/7) = (105 × 16 × 5) / (960 × 3 × 7) = 8400/15120 = 7/13.
Therefore, (−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7) equals 7/13.
nope
Apologies for the continued errors. Let's try solving the expression once again:
To solve: (−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7)
First, let's simplify the multiplication: (−3/5) × (5/16) × (7/12) = (-3/5) × (7/12) = -21/60 = -7/20.
Next, let's simplify the division: -7/20 ÷ (−3/16) × (−5/7) = -7/20 ÷ (-3/16) = -7/20 × (-16/3) = 112/60 = 28/15.
Therefore, (−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7) equals 28/15.
it's wrong
Apologies for the continued mistakes. Let's try solving the expression once again:
To solve: (−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7)
First, let's simplify the multiplication: (−3/5) × (5/16) × (7/12) = (-3 × 5 × 7) / (5 × 16 × 12) = (-105) / (960).
Next, let's simplify the division: (-105/960) ÷ (−3/16) × (−5/7) = (-105/960) × (16/-3) × (-5/7) = (105 × 16 × 5) / (960 × 3 × 7) = -4200/15120 = -7/26.
Therefore, (−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7) equals -7/26.
still no
Apologies for the continued incorrect responses. Let's try solving the expression again:
To solve: (−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7)
First, let's simplify the multiplication: (-3/5) × (5/16) × (7/12) = (-3 × 5 × 7) / (5 × 16 × 12) = (-105) / (960).
Next, let's simplify the division: (-105/960) ÷ (−3/16) × (−5/7).
To divide fractions, we multiply by the reciprocal of the second fraction: (-105/960) × (16/-3) × (7/-5).
Multiplying the numerators and denominators gives us: (-105 × 16 × 7) / (960 × -3 × -5) = 11760 / 7200.
Simplifying the fraction gives us: 49/30.
Therefore, (−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7) equals 49/30.
still wrong
Apologies for the repeated errors. Let's solve the expression accurately:
To solve: (−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7)
Let's simplify each part of the expression:
(−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7)
= ((−3) × (5) × (7)) / ((5) × (16) × (12)) ÷ ((−3) / (16)) × ((−5) / (7))
= (−105) / (5*16*12) ÷ (−3/16) × (−5/7)
= (−105) / 960 ÷ (−3/16) × (−5/7)
When dividing fractions, we multiply by the reciprocal of the divisor:
= (−105) / 960 × (16/−3) × (−7/5)
= (−105 × 16 × −7) / (960 × −3 × 5)
= (11760) / (7200)
Now, let's simplify this fraction:
11760 can be divided by 80 and 7200 can be divided by 80:
= (147) / (90)
Therefore, (−3/5) × (5/16) × (7/12) ÷ (−3/16) × (−5/7) = 147/90, which simplifies to 7/6.
wrong
Use the properties of operations and rules for multiplying and dividing to solve:
(89)×(−34)÷(19)×(−45)÷(35)
(1 point)