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Three partners A, B and C share profit such that three times the share of A is equal to two times the share of B and equal to 12times the share of C. What is the ratio of the profits of A, B and C respectively?
A
3 : 2 : 12
B
12 : 2 : 3
C
4 : 6 : 1
D
1 : 6 : 4
Correct Answer:
4 : 6 : 1
Simplify the value of $$\frac{{{\text{0}}{\text{.9}} \times {\text{0}}{\text{.9}} \times {\text{0}}{\text{.9 + 0}}{\text{.2}} \times {\text{0}}{\text{.2}} \times {\text{0}}{\text{.2 + 0}}{\text{.3}} \times {\text{0}}{\text{.3}} \times {\text{0}}{\text{.3}} - {\text{3}} \times 0.9 \times {\text{0}}{\text{.2}} \times {\text{0}}{\text{.3}}}}{{{\text{0}}{\text{.9}} \times {\text{0}}{\text{.9 + 0}}{\text{.2}} \times {\text{0}}{\text{.2 + 0}}{\text{.3}} \times {\text{0}}{\text{.3}} - 0.9 \times {\text{0}}{\text{.2}} - {\text{0}}{\text{.2}} \times {\text{0}}{\text{.3}} - 0.3 \times 0.9}} = ?$$
A
1.4
B
0.054
C
0.8
D
1.0
$$\frac{{38 \times 38 \times 38 + 34 \times 34 \times 34 + 28 \times 28 \times 28 - 38 \times 34 \times 84}}{{38 \times 38 + 34 \times 34 + 28 \times 28 - 38 \times 34 - 34 \times 28 - 38 \times 28}}$$ is equal to = ?
A
24
B
32
C
44
D
100
A, B and C are partners. They admit D as a partner and gurantee that his share of profit shall not be less than Rs. 20,000 p.a. Profits are to be shared in the ratio of 4 : 3 : 3 : 2 respectively. If total profits for a year were Rs. 96,000, A's share of profits will be:
A
Rs. 30,400.00
B
Rs. 32,000.00
C
Rs. 33,777.78
D
Rs. 24,000.00
The profit – sharing ratio of two partners is 2 : 3 if another partner is added with 40% of the profit – sharing ratio and the profit – sharing ratio of the initial two partners remains the same. Find the new profit – sharing ratio.
A
5 : 7 : 9
B
6 : 7 : 9
C
6 : 8 : 9
D
6 : 9 : 10
X and Y are partners and sharing profits-losses in the ratio of 4 : 3. They admit Z in partnership giving $${\frac{1}{3}^{{\text{rd}}}}$$ share in profits/losses. If Z receives his share from X and Y in equal proportion, the share of Y in profits/loses in future will be
A
$$\frac{{11}}{{42}}$$
B
$$\frac{{17}}{{42}}$$
C
$$\frac{{14}}{{42}}$$
D
$$\frac{{28}}{{42}}$$
A and B share profits and losses in a firm in the ratio of 3 : 2. And C entered in the firm as a new partner; his profit sharing ratio is $$\frac{1}{4}$$. If C has taken his share of profit from A and B in equal ratio, then the new profit shearing ratio will be ?
A
19 : 11 : 1
B
19 : 11 : 10
C
10 : 11 : 9
D
10 : 11 : 19
A and B partners sharing profits in the ratio of 7 : 3. C is admitted for $$\frac{3}{7}$$ share in the profit. The new profit-sharing ratio of the partners will be:
A
14 : 6 : 15
B
7 : 6 : 7
C
7 : 3 : 3
D
5 : 3 : 3
A and B are partners sharing profits and losses in the ratio 3 : 1. They decided to admit C. C will be given $${\frac{1}{4}^{{\text{th}}}}$$ share in future profits of the firm which he takes from A and B in ratio 2 : 1. New profit sharing ratio will be:
A
4 : 3 : 1
B
7 : 2 : 3
C
3 : 1 : 7
D
7 : 3 : 2
Profits of a business are divided among three partners A, B and C in such a way that 4 times the amount received by A is Equal to 6 times the amount received by B and 11 times the amount received by C. The ratio in which the three received the amount is.
A
4 : 6 : 11
B
11 : 6 : 4
C
33 : 22 : 12
D
33 : 6 : 14
W, X, Y are partners. They admitted Z into the firm and gave him guarantee that his share in profits will not be less than Rs. 10,000 p.a.. Profits will be shared in 4 : 3 : 3 : 2. If profit for the year is Rs. 48,000 then what is profit share of each partner?
A
W = 15,200, X = 11,400, Y = 11,400, Z = 10,000
B
W = 16,000, X = 11,000, Y = 11,000, Z = 10,000
C
W = 16,000, X = 12,000, Y = 12,000, Z = 8,000
D
W = 15,200, X = 11,200, Y = 12,000, Z = 10,400