If m,r,x and y are positive, is the ratio of m to r is equal to the ratio of x to y ?
(1) The ratio of m to y is equal to ratio of x to r.
(2) The ratio of m+x to r+y is equal to the ratio of x to y.
As per my understanding in both the cases answer to what has been asked is no i.e (D).
But answer is different. pleas help me with the basics.
Basics.......Problem
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Target question: Is the ratio of m to r is equal to the ratio of x to y?kaudes11114 wrote:If m,r,x and y are positive, is the ratio of m to r is equal to the ratio of x to y ?
(1) The ratio of m to y is equal to ratio of x to r.
(2) The ratio of m+x to r+y is equal to the ratio of x to y.
We can rephrase this as . . .
REPHRASED target question: Does m/r = x/y?
We may find it useful to take the equation m/r = x/y and cross-multiply to get my = rx. This allows us to rephrase the target question in one more way . . .
REPHRASED target question: Does my = rx?
Statement 1: The ratio of m to y is equal to ratio of x to r
In other words, m/y = x/r
This LOOKS similar to m/r = x/y (one of our target questions), but it is not the same.
There are several values of m, r, x and y that satisfy this condition. Here are two:
Case a: m = r = x = y = 1, in which case m/r = x/y
Case b: m = 1, y = 2, x = 3 and r = 6, in which case m/r ≠x/y
Since we cannot answer the target question with certainty, statement 1 is NOT SUFFICIENT
Statement 2: The ratio of m+x to r+y is equal to the ratio of x to y.
In other words, (m+x)/(r+y) = x/y
Cross multiply to get: y(m+x) = x(r+y)
Expand: ym + yx = xr + xy
Subtract xy from both sides to get: ym = xy
Perfect, we've shown that ym = xy, and this is one of our REPHRASED target questions.
Since we can answer the REPHRASED target question with certainty, statement 2 is SUFFICIENT
Answer = B
Cheers,
Brent