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प्रश्न
Solve the following simultaneous equations by the substitution method.
0.4x + 0.5y = 2.5, 0.3x – 0.1y = 1.4
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उत्तर
Given the simultaneous equations:
0.4x + 0.5y = 2.5
0.3x – 0.1y = 1.4
Step 1: Express (x) from equation (2)
From (2),
0.3x – 0.1y = 1.4
0.3x = 1.4 + 0.1y
`x = (1.4 + 0.1y)/0.3`
`x = 1.4/0.3 + (0.1y)/0.3`
`x = 14/3 + y/3`
Step 2: Substitute this value of (x) into equation (1)
Substitute `(x = 14/3 + y/3)` into (1):
`0.4 (14/3 + y/3) + 0.5 y = 2.5`
Multiply out:
`0.4 xx 14/3 + 0.4 xx y/3 + 0.5 y = 2.5`
`(5.6)/(3) + (0.4y)/(3) + 0.5 y = 2.5`
Convert fractions to decimals for clarity:
1.8667 + 0.1333y + 0.5y = 2.5
1.8667 + 0.6333y = 2.5
Step 3: Solve for (y)
0.6333y = 2.5 – 1.8667
0.6333y = 0.6333
`y = (0.6333)/(0.6333)`
y = 1
Step 4: Substitute (y = 1) back to find (x)
`x = 14/3 + 1/3`
`x = 15/3`
x = 5
