Statement Sums involving Linear Equations


 
 
Concept Explanation
 

Statement Sums involving Linear Equations

Statement Sums involving Linear Equation: In these sums a certain situation is given we have to analyse the statement and then suppose a certain quantity. and will then try to identify a relation with the quantity we have supposed.

The procedure to translate a word problem in the form of an equation is known as the formulation of the problem. Thus, the process of solving a word problem consists of two parts, namely, formulation and solution.

The following steps should be followed to solve a word problem:

Step I  Read the problem carefully and note what is given and what is required.

Step II Denote the unknown quantity by some letters, say x, y, z, etc.

Step III Translate the statements of the problem into mathematical statements.

Step IV Using the condition (s) given in the problem, form the equation

Step V Solve the equation for the unknown.

Step VI Check whether the solution satisfies the equation.

Example: The numerator of a fraction is 4 less than the denominatr. If 1 is added to both its numerator and denominator, it becomes 1/2. FInd the fraction.

Solution  Let the denominator of the fraction be x. Then,

Numerator of the fraction = x - 4

large therefore    Fraction large =frac{x-4}{x}

If 1 is added to both its numerator and denominator, the fraction becomes large frac{1}{2}.

large therefore    large frac{x-4+1}{x+1}=frac{1}{2}

large Rightarrow frac{x-3}{x+1}=frac{1}{2}

large Rightarrow 2(x-3)=x+1                           [ Using cross - multiplication]

large Rightarrow 2x-6=x+1

large Rightarrow 2x-x=6+1

large Rightarrow x=7

Putting x = 7 in (i), we get

Fraction large =frac{7-4}{7}=frac{3}{7}.  Hence, the given fraction is large frac{3}{7}.

 

Example : How much pure alcohol be added to 400 ml of a 15% solution to make its strength 32%?

Solution    Let x ml pure alcohol be added to 400 ml of a 15% solution to make its strength 32%. Here, 15% solution means that there is 15 ml pure alcohol in a solution of 100 ml.

Now, Quantity of alcohol in 100 ml solution = 15 ml

large therefore   Quantity of alcohol in one ml solution large =frac{15}{100};ml

       Quantity of alcohol in 400 ml solution large =frac{15}{100}times 400;ml=60; ml

       Total quantity of the solution = (400 + x) ml

       Total quantity of alcohol in (400 + x) ml solution = (60 + x) ml

large therefore    Quantity of alcohol in one ml large =frac{60+x}{400+x};ml

        Quantity of alcohol in 100 ml large large =frac{60+x}{400+x}times 100;ml

large Rightarrow   Strength of the solution large =left ( frac{60+x}{400+x} right )times   100%

But, the strength of the solution is given as 32%.

large therefore ;;frac{60+x}{400+x}times 100=32

large Rightarrow ;;100(60+x)=32(400+x)         [ Multiplying both sides by (400 + x)]

large Rightarrow ;;6000+100x=12800+32x

large Rightarrow ;;100x-32x=12800-6000

large Rightarrow ;;68x=6800

large Rightarrow ;;frac{68x}{68}=frac{6800}{68}

large Rightarrow ;;x=100

Thus, 100 ml alcohol must be added to make 32% strength of the solution.

Sample Questions
(More Questions for each concept available in Login)
Question : 1

Salaries of Ravi and Sumit are in the ratio 2 : 3. If the salary of each is increased by Rs. 4000, the new ratio becomes 40 : 57. What is Sumit's salary?

Right Option : D
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Explanation
Question : 2

Two numbers are in the ratio 5:6. If 8 is subtracted from each, the ratio becomes 4:5. Find the numbers.

Right Option : D
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Question : 3

The ratio of price of three different types of jeeps is 4:5:7 if the difference between the constliest and the cheapest is Rs.60000,the price of the jeep of the modest price is

Right Option : B
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Explanation
 
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