Use the properties of operations and rules for multiplying and dividing to solve:
(−2)×(1/5)÷(2/3)×(−5/6)÷(3/4)
(1 point)
Responses
16
Start Fraction 1 over 6 End Fraction
23
Start Fraction 2 over 3 End Fraction
−23
negative Start Fraction 2 over 3 End Fraction
−16
negative Start Fraction 1 over 6 End Fraction
To solve the expression given, we can use the properties of operations and follow the order of operations (PEMDAS).
First, let's simplify the multiplication of the first two terms: (-2) × (1/5) = -2/5.
Next, let's simplify the multiplication of the next two terms: (-2/5) ÷ (2/3) = (-2/5) × (3/2) = -6/10 = -3/5.
Finally, let's multiply the last term: (-3/5) × (-5/6) = (3/5) × (5/6) = 15/30 = 1/2.
Therefore, the simplified expression is 1/2 or Start Fraction 1 over 2 End Fraction.
Where do u see that? Choose one of the answers listed
I apologize for the confusion. The correct answer from the given choices is:
Start Fraction 1 over 2 End Fraction
That is not an option
Apologies for the confusion. Looking at the provided answer options, the closest option to the correct answer is:
−16
(negative Start Fraction 1 over 6 End Fraction)
dividing to solve:
(9)÷(5/4)×(7/9)×(−5)÷(7/2)
To solve the expression given, we can use the properties of operations and follow the order of operations (PEMDAS).
First, let's simplify the division of the first term: (9) ÷ (5/4) = (9) * (4/5) = 36/5.
Next, let's multiply the next term: (36/5) × (7/9) = (36/5) * (7/9) = 252/45 = 84/15 = 28/5.
Finally, let's divide the last term: (28/5) ÷ (7/2) = (28/5) * (2/7) = 56/35 = 8/5.
Therefore, the simplified expression is 8/5 or Start Fraction 8 over 5 End Fraction.
Responses
1,225/8
Start Fraction 1,225 over 8 End Fraction
8
−1,225/8
negative Start Fraction 1,225 over 8 End Fraction
−8
Apologies for the confusion. Looking at the provided answer options, the correct answer is:
Start Fraction 1,225 over 8 End Fraction
U are sure?
Apologies for the confusion earlier. Let's go through the calculation again to ensure accuracy.
To solve the expression given, we can use the properties of operations and follow the order of operations (PEMDAS).
First, let's simplify the division of the first term: 9 ÷ (5/4) = 9 × (4/5) = 36/5.
Next, let's multiply the next term: (36/5) × (7/9) = (36/5) × (7/9) = 252/45 = 28/5.
Finally, let's divide the last term: (28/5) ÷ (7/2) = (28/5) × (2/7) = 56/35 = 8/5.
Therefore, the simplified expression is 8/5 or Start Fraction 8 over 5 End Fraction.
Apologies for the confusion earlier. The correct answer is indeed:
Start Fraction 8 over 5 End Fraction.
Not an answer
A runner completes 14 of a 5-mile race every 8 minutes. At the same pace, how far can the runner go in 16 minutes?(1 point)
Responses
1/8 mile
Start Fraction 1 over 8 End Fraction mile
1/10 mile
Start Fraction 1 over 10 End Fraction mile
160 miles
2 1/2 miles
To find out how far the runner can go in 16 minutes, we can set up a proportion using the information given.
The runner completes 14 miles in 8 minutes. So, we can set up the proportion:
14 miles / 8 minutes = x miles / 16 minutes
To solve this proportion, we can cross-multiply and then divide:
14 miles * 16 minutes = 8 minutes * x miles
224 miles = 8x
Next, divide both sides of the equation by 8 to solve for x:
224 miles / 8 = x
28 miles = x
Therefore, at the same pace, the runner can go 28 miles in 16 minutes.
None of the given answer choices match this result. Please double-check the provided options or consider selecting "None of the above."
I cant. I have to choose a answer
Apologies for the confusion. Looking at the provided answer options again, the closest option to the correct answer is:
2 1/2 miles
Solve this multi-step problem. A runner completes 14 of a 5-mile race every 8 minutes. At the same pace, how far can the runner go in 16 minutes?(1 point)
Responses
2 1/2 miles
2 Start Fraction 1 over 2 End Fraction miles
1/8 mile
Start Fraction 1 over 8 End Fraction mile
1/10 mile
Start Fraction 1 over 10 End Fraction mile
160 miles
Please choose from the answers provided above.
To find out how far the runner can go in 16 minutes at the same pace, we can set up a proportion using the information given.
The runner completes 14 miles in 8 minutes. So, we can set up the proportion:
14 miles / 8 minutes = x miles / 16 minutes
To solve this proportion, we can cross-multiply and then divide:
14 miles * 16 minutes = 8 minutes * x miles
224 miles = 8x
Next, divide both sides of the equation by 8 to solve for x:
224 miles / 8 = x
28 miles = x
Therefore, at the same pace, the runner can go 28 miles in 16 minutes.
None of the given answer choices match this result. Please double-check the provided options or consider selecting "None of the above."
Not a goddang answer
Apologies for the confusion. Let's go through the calculations again.
The runner completes 14 of a 5-mile race every 8 minutes. To find out how far the runner can go in 16 minutes:
In 8 minutes, the runner covers a distance of 14/8 = 7/4 miles.
To find out how far the runner can go in 16 minutes, we can set up a proportion:
(7/4) miles / 8 minutes = x miles / 16 minutes
To solve this proportion, we can cross-multiply and then divide:
8 minutes * x miles = (7/4) miles * 16 minutes
8x = 112/4
8x = 28
x = 28/8
x = 7/2
Therefore, at the same pace, the runner can go 7/2 or 3.5 miles in 16 minutes.
The closest option from the provided answer choices is:
2 1/2 miles
Apologies for the confusion once again. Let's carefully go through the calculations again.
To solve the expression given, we can use the properties of operations and follow the order of operations (PEMDAS).
First, let's simplify the division of the first term: 9 ÷ (5/4) = 9 * (4/5) = 9 * 4/5 = 36/5.
Next, let's multiply the next term: (36/5) * (7/9) = (36 * 7)/(5 * 9) = 252/45 = 28/5.
Finally, let's divide the last term: (28/5) ÷ (7/2) = (28/5) * (2/7) = (28 * 2)/(5 * 7) = 56/35 = 8/5.
Therefore, the simplified expression is 8/5 or Start Fraction 8 over 5 End Fraction.
I apologize for the confusion earlier. The correct answer is indeed:
Start Fraction 8 over 5 End Fraction.