Question:

Form the pair of linear equations for the following problems and find their solution by substitution method.

(i) The difference between two numbers is 26 and one number is three times the other. Find them.

(ii) The larger of two supplementary angles exceeds the smaller by 18 degrees. Find them.

(iii) The coach of a cricket team buys 7 bats and 6 balls for Rs 3800. Later, she buys 3 bats and 5 balls for Rs 1750. Find the cost of each bat and each ball.

(iv) The taxi charges in a city consist of a fixed charge together with the charge for the distance covered. For a distance of 10 km, the charge paid is Rs 105 and for a journey of 15 km, the charge paid is Rs 155. What are the fixed charges and the charge per km? How much does a person have to pay for travelling a distance of 25 km.

(v) A fraction becomes911\frac{ 9}{11}, if 2 is added to both the numerator and the denominator. If, 3 is added to both the numerator and the denominator it becomes 56\frac{5}{6}. Find the fraction.

(vi) Five years hence, the age of Jacob will be three times that of his son. Five years ago, Jacob’s age was seven times that of his son. What are their present ages?

Updated On: Aug 5, 2024
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Solution and Explanation

(i) Let the first number be x and the other number be y such that y > x. 

According to the given information,
y = 3x    ................(1)
y-x = 26 ...............(2)

On substituting the value of y from equation (1) into equation (2), we obtain
3x-x = 26
x=13 .................(3)

Substituting this in equation (1), we obtain 
y = 39 
Hence, the numbers are 13 and 39.


(ii) Let the larger angle be x and smaller angle be y.
We know that the sum of the measures of angles of a supplementary pair is always 180º. 
According to the given information,
x+y = 180º.................(1)
x-y = 18º ...................(2)

From (1), we obtain
x = 180º − y ...........................(3) 

Substituting this in equation (2), we obtain
180º -y-y = 18º
162º = 2y
 81º = y

Putting this in equation (3), we obtain
x = 180º − 81º = 99º

Hence, the angles are 99º and 81º. 


(iii) Let the cost of a bat and a ball be x and y respectively. 

According to the given information,
7x +6y = 3800...................(1)
3x +5y = 1750 ...................(2)

From (1), we obtain
y=38007x6\frac{ 3800 -7x}{6} ...................(3)

Substituting this value in equation (2), we obtain
3x+5(38007x6)=17503x + 5(\frac{3800 -7x}{6}) = 1750
3x+9500335x6=17503x + \frac{9500}{3} - \frac{35x}{6} = 1750
3x35x6=1750950033x - \frac{35x}{6} = 1750 - \frac{9500}{3}
18x35x6= 525095003 \frac{ 18x - 35x}{6} =\frac{  5250 -9500}{3} 
17x6=42503\frac{-17x}{6} = \frac{-4250}{3}
17x=8500 -17x = -8500
x=500x= 500

Substituting this in equation (3), we obtain
y=38007×5006 \frac{3800-7 \times 500}{6}
y= 3006\frac{300}{6} = 5050

Hence, the cost of a bat is Rs 500 and that of a ball is Rs 50. 


(iv) Let the fixed charge be Rs x and per km charge be Rs y. 

According to the given information, 
x+10y = 105 .........(1)
x+15y= 155...........(2)

From (3), we obtain
x= 105 -10y............(3)

Substituting this in equation (2), we obtain
105 - 10y + 15y = 155
5y = 50 
y=10

Putting this in equation (3), we obtain
x = 10510×10 105 - 10 \times 10 
x =5 5

Hence, fixed charge = Rs 5
And per km charge = Rs 10
Charge for 25 km = x + 25y = 5 + 250 = Rs 255


(v) Let the fraction be xy.\frac{x}{y}. 

According to the given information, 
x+2y+2\frac{x+2}{ y+2} = 911  \frac{9}{11 }
11x+22=9y+1811x +22 = 9y +18
11x9y=411x -9y = -4 ..............(1)
and
x+3y+3=56 \frac{x+3}{y+3} = \frac{5}{6 }
6x+18=5y+15 6x +18 = 5y +15 
6x5y=3.6x - 5y = -3...............(2)

From equation (1), we obtain
x=4+9y11x = \frac{-4+9y}{11} .............(3)

Substituting this in equation (2), we obtain
6(4+9y11)5y=36( \frac{-4 +9y }{11} ) -5y = -3
24+54y55y=33-24 +54y -55 y = -33
y=9-y = -9
y=9y=9

Substituting this in equation (3), we obtain
x=4+8111=7x= \frac{-4 +81}{11} = 7

Hence, the fraction is 79\frac{7}{9}.


(vi) Let the age of Jacob be x and the age of his son be y.

 According to the given information,
(x+5) = 3(y+5)
x-3y = 10 .............(1)
and 
(x-5) = 7(y-5)
x-7y = -30 ............(2)

From (1), we obtain
x = 3y +10............(3)

Substituting this value in equation (2), we obtain
3y +10 - 7y = -30
-4y = -40
y = 10

Substituting this value in equation (3), we obtain 
x =3×10+10  3 \times 10 + 10 
x = 40

Hence, the present age of Jacob is 40 years whereas the present age of his son is 10 years.

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