Published: Published Date – 11:10 PM, Tue – 9 August 22

Get a grip on arithmetic problems

This article is in continuation to the last article focusing on the ratio and proportion topic. Here are some practice questions along with solutions on the ratio and proportion topic that will help you in your preparation for the State government recruitment jobs.

The salary of Charan and Raju is in the ratio of 5 : 4. If the salary of each is increased by Rs 3,000, then their new ratio becomes 6 : 5. What is the salary of Charan?

a) Rs 12,500 b) Rs 12,000 c) Rs 15,500 d) Rs 15,000

Ans: d

Solution: 5 : 4
6 : 5
1 part –>; 3000
5 parts –>; ?
5 × 3000 = Rs 15,000

Which of the following should be added to each of the four numbers 4, 8, 12, 22 to make them proportional?

a) 3/4 b) 4/3 c) 3/8 d) 8/3

Ans: b

Solution: Let the number = k
4 k / 8 k = 12 k / 22 k
88 4k 22k k² = 96 12k 8k k²
88 26k = 96 20k
6k = 8
k = 8/6
k = 4/3

If a, b, c and d are in continued proportion, then (ma³ nb³ -rc³) : (mb³ nc³ – rd³) =

a) a : d b) d : a c) b : c d) c : b

Ans: a

Solution: a/b = b/c = c/d = k
c = dk, b = ck, a = bk
b = (dk)k
b = dk²
Since, a = bk
–>; a = (dk)²k
a/d = k³ ……………… (i)
= (ma³ nb³ -rc³) / (mb³ nc³ – rd³) =
= {m(dk³)³ n(dk²)³ -r(dk)³) : (m(dk²)³ n(dk)³ – rd³) =
= k³
From (i)
k³ = a/d
= a : d

If a : b = c : d, then ma nc / mb nd is equal to

a) a : b b) b : a c) m : n d) n : m

Ans: a

Solution: Let a/b = c/d = k
a = bk, c = dk
= ma nc / mb nd = m(bk) n(dk) / mb nd
= k(mb nd) / mb nd
= k
k = a/b
= a : b

To get the ratio p : q (for p ≠ q) one has to add a number to each term of the ratio x : y. the number is

a) px qy / p – q b) qx – py / p – q c) px – qy / p – q d) py – qx / p – q

Ans: b

Solution: Let the number to be added be a
x a / y a = p/q
qx aq = py ap
qx – py = a (p – q)
a = qx – py / p – q
To be continued…

 



Source link

By admin

Leave a Reply

Your email address will not be published. Required fields are marked *