Table of contents | |
What are Mixtures & Alligations | |
Types of Mixtures | |
Rule of Alligation | |
Important Formulae | |
Applications of Alligations |
Mixtures and Alligations is an essential topic that focuses on problems involving the blending of two or more ingredients with varying characteristics, such as price, concentration, or quantity.
Hence, 40 litres of pure water should be mixed to get the desired new solution.
As we have studied in this chapter, we just have two important formulas to solve all the questions
1.
It is also called the rule of alligation and can also be represented as
2.
We will see how the rule of allegation can be applied in mixture problems-
Example 1: A shopkeeper mixes 30 kg of type A rice at Rs.40/kg and 45 kg of type B rice at Rs.30/kg, then finds the price of a formed mixture of rice.
Sol:
By the rule of alligation:
(30 – M): (M – 40) = 30: 45 = 2: 3
90 – 3M = 2M – 805M = 170M = 34
Hence, price of mixture = Rs.34/kg
Note: After applying the concept of alligation on the price of the item of concentration of mixture we will get the ratio in which these two items or mixture are mixed.
Sol: Water percent in mixture A = 100% – 75% of 25%
By the rule of alligation:Required ratio = -5: -10
= 1: 2
Example 3: In what ratio should a shopkeeper mix two types of rice, one costing 20 rupees/kg and another costing 10 rupees/kg to get a rice variety costing 14 rupees/kg?
Sol: Here also we can use Alligation as follows:
x = 14-10 = 4
y = 20-14 = 6
The ratio between the type 1 and type 2 rice is 4:6 or 2:3
Example 1: A shopkeeper sells type A rice at 20% profit and type B rice at 15% loss. If overall he earns 13% profit, then find the cost price of type A rice to type B rice.
Sol: By the rule of alligation:
The ratio of the cost price of type A to type B rice = -28: -7
= 4: 1
Note: After applying alligatiion concept in profit/loss percent earned on the items we will get the ratio of cost prices of the items.
Example 2: A shopkeeper purchased a table for Rs.1200 and sold it at 20% profit, he purchased a chair at Rs.400 and sold it at 10% profit, the find the overall profit percent earned by him.
Sol: Let overall profit percent = M%
By the rule of allegation:(10 – M): (M – 20) = 1200: 400 = 3: 1
10 – M = 3M – 60
4M = 70
M = 17.5
Hence, overall profit percent = M = 17.5%
The concept of mixture and alligation can be used to find the average speed of journey.
Example 1: A person covers the first 3 hours of a journey with a speed 80 km/h and the remaining 5 hours with a speed 56 km/h, then find his average speed of the journey.
Sol: Let average speed = X
By the rule of allegation:(56 – X): (X – 80) = 3: 5
280 – 5X = 3X – 240
8X = 520
X = 65
Average speed of journey = 65 km/h
Note: After applying the concept of alligation on speed on different parts of the journey we will get the ratio of time taken to cover those parts.
Example 2: A distance of 360 km can be covered in 6 hours when some part of the journey is covered with speed 45 km/h and remaining with speed 90 km/h, then find the distance covered with speed 45 km/h.
Sol: Average speed of the journey = 360/6 = 60 km/h
By the rule of allegation:Ratio of time taken = 30: 15 = 2: 1
Time for which journey is covered with speed 45 km/h = 6 * (2/3) = 4 hours
Distance covered by 45 km/h speed = 45 * 4 = 180 km
The concept of alligation can be applied to SI and CI if we can calculate the effective interest rate for given time period.
For example:
Equivalent of 20% SI for 3 years = 20% * 3 = 60%
Equivalent of 20% CI for 2 years = [(1.2)2 – 1] * 100 = 44%
Example: Rahul lent Rs.5000 to Sumit at 25% SI for 2 years and borrowed Rs.3000 from Suresh for 3 years 10% SI, then find the profit/loss on interest amount of Rahul.
Sol: Effective rate of interest for 2 years on lent amount = 25% * 2 = 50%
Effective rate of interest for 3 years on borrowed amount = -10% * 3 = -30% [Negative because interest will be given.]
By the rule of allegation:
(-30 – X): (X – 50) = 5000: 3000 = 5: 3
-90 – 3X = 5X – 250
8X = 160
X = 20
Hence, total profit on interest amount = 20% of (5000 + 3000) =
= Rs.1600
Note: After applying the alligation concept in effective interest rate we will get the ratio of amount invested.
By applying the rule of alligation we can solve the problems of averages, ratios, and percentages quickly.
Example 1: Average age of a 25 students of a class is 24 years and average age of remaining 15 students of the class is 18 years, then find the average age of the class.
Sol: Let average age of class = A
By the rule of alligation:
(18 – A): (A – 24) = 25: 15 = 5: 3
54 – 3A = 5A – 120
8A = 174
A = 21.75
Hence, average age of the class = A = 21.75 years
Example 2: Ratio of marks obtained to maximum marks by Arun in math and English is 5: 3 and 3: 1. If maximum marks in both the subjects are same, then find the ratio of marks obtained to maximum marks by Arun when both the subjects are taken together.
Sol: By the rule of alligation:
(3/4 – A): (A – 5/8) = 1: 1
3/4 – A = A – 5/8
2A = 11/8
A = 11/16
Required ratio = 11: (16 – 11) = 11: 5
Example 3: In states A and B out of the total population, the male population is 60% and 50% respectively. If the male population, when both the states are taken together, becomes 58% of the total population, then find that total population of state B is what percent of that of state A.
Sol: By the rule of allegation:
Ratio of total population of state A to that of state B = -8: -2 = 4: 1
Required percent = (1/4) * 100
= 25%
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1. What is the definition of mixtures and alligations in mathematics? |
2. What are the types of mixtures commonly encountered in problems related to alligations? |
3. What is the Rule of Alligation, and how is it applied? |
4. Can you provide important formulae related to mixtures and alligations? |
5. What are some practical applications of alligations in real-life scenarios? |
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