When positive integer x is divided by positive integer y, the remainder is 9. If x/y = 96.12, what is the value of y?
A. 96
B. 75
C. 48
D. 25
E. 12
---please explain .
division problem
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given that when x is divide by y the remainder is 9.. also given that x/y=96.12... so 9/y=.12..... therefore y = 75... ans bash_maverick wrote:When positive integer x is divided by positive integer y, the remainder is 9. If x/y = 96.12, what is the value of y?
A. 96
B. 75
C. 48
D. 25
E. 12
---please explain .
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When positive integer x is divided by positive integer y, the remainder is 9. If x/y = 96.12, what is the value of y?
A. 96
B. 75
C. 48
D. 25
E. 12
---please explain
x / y = 96.12 = 9612 / 100 = 4806/50 = 2403/25
However, 25 can't be the divisor in this question since if you observe carefully, the remainder is only 3 and not 9.
Thus it can be multiple of 25. Which points towards Option B
Now try B
2403/25 can also be written as 2403*3 / 25*3 = 7209/75. When 7209 is divided by 75 the remainder is 9. hence it's B
A. 96
B. 75
C. 48
D. 25
E. 12
---please explain
x / y = 96.12 = 9612 / 100 = 4806/50 = 2403/25
However, 25 can't be the divisor in this question since if you observe carefully, the remainder is only 3 and not 9.
Thus it can be multiple of 25. Which points towards Option B
Now try B
2403/25 can also be written as 2403*3 / 25*3 = 7209/75. When 7209 is divided by 75 the remainder is 9. hence it's B
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when dividing , we obtain a solution of the form
$$\frac{numerator}{deno\min ator}=whole\ number\ +\ \frac{remainder}{deno\min ator}$$
let K be a whole number
$$\frac{x}{y}=k\ +\ \frac{9}{y}=\ 96.12=96+\frac{12}{100}$$
here, k=96 and $$\frac{9}{y}=\ \frac{12}{100}$$
$$y=75$$ (correct answer)
therefore, $$\frac{x}{y}=96+\frac{9}{75}$$
$$\frac{numerator}{deno\min ator}=whole\ number\ +\ \frac{remainder}{deno\min ator}$$
let K be a whole number
$$\frac{x}{y}=k\ +\ \frac{9}{y}=\ 96.12=96+\frac{12}{100}$$
here, k=96 and $$\frac{9}{y}=\ \frac{12}{100}$$
$$y=75$$ (correct answer)
therefore, $$\frac{x}{y}=96+\frac{9}{75}$$
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There are a few ways to tackle this question.When positive integer x is divided by positive integer y, the remainder is 9. If x/y = 96.12, what is the value of y?
A. 96
B. 75
C. 48
D. 25
E. 12
One way is to examine a few other fractions.
7/2 = 3 with remainder 1.
7/2 = 3 1/2 = 3.5
Notice that 0.5 = 1/2
Another example:
11/4 = 2 with remainder 3.
11/4 = 2 3/4 = 2.75
Notice that 0.75 = 3/4
Now onto the question....
So, we know that x/y = some value with remainder 9
If x/y = 96.12, we can conclude that 0.12 = 9/y
Now solve for y.
0.12 = 9/y
12/100 = 9/y [rewrite 0.12 as 12/100]
Simplify to get: 3/25 = 9/y
At this point, we might already see that y = 75. If we don't spot this, we can always cross-multiply.
We get: 3y = (25)(9)
Solve to get y = 75
Cheers,
Brent
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ash_maverick wrote:When positive integer x is divided by positive integer y, the remainder is 9. If x/y = 96.12, what is the value of y?
A. 96
B. 75
C. 48
D. 25
E. 12
---please explain .
We can create quotient/remainder equation, where the quotient Q is an integer:
x/y = Q + 9/y
We also are given that x/y = 96.12. Using the remainder formula, we can say:
x/y = 96.12
x/y = 96 + 0.12
x/y = 96 + 12/100
Because Q is always an integer, we see that Q must be 96, and thus the remainder 9/y must be 12/100. We can now equate 9/y to 12/100 and determine the value of y.
9/y = 12/100
12y = 9 x 100
y = 900/12 = 75
Note: Had we simplified 12/100 to 3/25 first, we would have also obtained the same answer. See below.
9/y = 3/25
3y = 9 x 25
y = 3 x 25 = 75
Answer: B
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