Q.10. (a) Find the value of x and y it -
2x + 3y = 33
5x - 20 = 8y
Answers
Answer:
Answer
Step-by-step explanation:
Solution :
The two given equations are
2x + 3y = 23 (i)
5x - 20 = 8y (ii)
We have to find the values of x and y using Substitution method.
From equation no (i), we get
2x = 23 - 3y (iii)
From equation no (ii), we get
5x - 20 = 8y
⇒ 2 (5x - 20) = 2 × 8y
⇒ 10x - 40 = 16y
⇒ 5 (2x) - 40 = 16y
⇒ 5 (23 - 3y) - 40 = 16y, substituting the value of x from (iii) no equation
⇒ 115 - 15y - 40 = 16y
⇒ 31y = 75
⇒ y = 75/31
From equation no (iii), we get
2x = 23 - 3 (75/31)
⇒ 2x = 23 - (225/31)
⇒ 2x = (23 × 31 - 225)/31
⇒ 2x = (713 - 225)/31
⇒ 2x = 488/31
⇒ x = 244/31
∴ the required solution is
x = 244/31 , y = 75/31
Verification :
Putting x = 244/31, y = 75/31 in equation no. (i), we get
2 (244/31) + 3 (75/31)
= 488/31 + 225/31
= (488 + 225)/31
= 713/31
= 23
Similarly putting x = 244/31, y = 75/31 in equation no (ii), we get
5 (244/31) - 20
= 1220/31 - 20
= (1220 - 20 × 31)/31
= (1220 - 620)/31
= 600/31
= 8 (75/31)
Hence, verified.
Answer:
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