AbeNeedsAnswers wrote: ↑Sun May 17, 2020 8:28 pm
3P5
+ 4QR
--------
8S4
In the correctly worked addition problem shown, P, Q, R, and S are digits. If Q = 2P, which of the following could be the value of S?
A. 3
B. 4
C. 5
D. 7
E. 9
A
One approach is to use logic/number sense two determine the missing values.
Another approach is to solve this question
algebraically
Key property: The VALUE of the 3-digit integer abc can be written as follows: abc = 100a + 10b + c
For example: 625 = 100(6) + 10(2) + 5
Likewise:
3P5 = 100(3) + 10(P) + 5,
4QR = 100(4) + 10(Q) + R, and
8S4 = 100(8) + 10(S) + 4
So the addition, 3P5 + 4QR = 8S4 can be written algebraically as: (300 + 10P + 5) + (400 + 10Q + R) = 800 + 10S + 4
Simplify: 705 + 10P + 10Q + R = 804 + 10S
Subtract 705 from both sides to get: 10P + 10Q + R = 99 + 10S
Subtract 10S from both sides: 10P + 10Q - 10S + R = 99
Subtract R from both sides: 10P + 10Q - 10S = 99 - R
Factor the left side: 10(P + Q - S) = 99 - R
Finally, since we're told that Q = 2P, we can substitute to get: 10(P + 2P - S) = 99 - R
Simplify: 10(3P - S) = 99 - R
Since 10(3P - S) is a
multiple of 10, and since
R is a digit, we know that
R must equal 9
We get: 10(3P - S) = 99 - 9 = 90
Now take: 10(3P - S) = 90
Divide both sides by 10 to get: 3P - S = 9
Rearrange to get: S = 3P - 9
Factor to get: S =
3(P - 3)
This means S is a multiple of
3
Check the answer choices..... answer choice A (3) is the only multiple of
3
Answer: A
Cheers,
Brent
