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प्रश्न
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A telecommunication company came up with two plans- plan A and plan B for its customers. The plans are represented by linear equations where ‘t’ represents the time (in minutes) bought and ‘C’ represents the cost. The equations are:
Plant B : 3C = 10t + 300 |
Based on the above information, answer the following questions:
- If you purchase plan B, how much initial amount you have to pay? (1)
- Charu purchased plan A. How many minutes she bought for ₹250? (1)
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- At how many minutes, do both the plans charge the same amount? What is that amount? (2)
OR - Which plan is better if you want to buy 60 minutes? Give reason for your answer. (2)
- At how many minutes, do both the plans charge the same amount? What is that amount? (2)
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उत्तर
i. For plan B : 3C = 10t + 300
To find initial amount for plan B,
We put t = 0
3C = 10t + 300
⇒ 3C = 10 × 0 + 300
⇒ 3C = 0 + 300
⇒ 3C = 300
⇒ C = `300/3`
⇒ C = 100
ii. Chase purchased plan A.
∵ Plan A : 3C = 20t
C = ₹ 250
Putting the value of C in plan A.
3C = 20t
⇒ 3 × 250 = 20t
⇒ 750 = 20t
⇒ t = `750/20`
⇒ t = 37.5 minutes
iii. a. If both plan have same changes
Plan A : 3C = 20t
C = `(20t)/3` ...(1)
Plan B : 3C = 10t + 300
⇒ C = `(10t + 300)/3` ...(2)
From equation (1) and equation (2),
`(20t)/3 = (10t + 300)/3`
⇒ 20t = 10t + 300
⇒ 20t – 10t = 300
⇒ 10t = 300
⇒ t = `300/10`
⇒ t = 30 minutes
For amount, putting the value of t in plan A and plan B
3C = 20t
⇒ 3C = 20 × 30
⇒ 3C = 600
⇒ C = `600/3`
⇒ C = ₹ 200
3C = 10t + 30
⇒ 3C = 10 × 30 + 300
⇒ 3C = 300 + 300
⇒ 3C = 600
⇒ C = `600/3`
⇒ C = ₹ 200
OR
b. For t = 60 minutes.
To find which plan is best, putting the value of t = 60 is both plan A and plan B.
Plan A : 3C = 20t
⇒ 3C = 20 × 60
⇒ 3C = 1200
⇒ C = `1200/3`
⇒ C = ₹ 400
Plan B : 3C = 10t + 300
⇒ 3C = 10 × 60 + 300
⇒ 3C = 600 + 300
⇒ 3C = 900
⇒ C = `900/3`
⇒ C = ₹ 300
∵ 400 > 300
Plan A > Plan B
So, plan B is best, because it’s low cost.
