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    Question

    Quantity-I: β€˜A’ and β€˜B’ started a business by

    investing Rs. β€˜x’ and Rs. 4,800, respectively. β€˜A’ and β€˜B’ invested their sum for 8 months and 10 months, respectively. If ratio of profit share of β€˜A’ and β€˜B’ is 2:3, respectively, then find the value of β€˜x’? Quantity-II: If a:b = 3:2 and b = 2000, then find the value of β€˜a’. In the question, two Quantities I and II are given. You have to solve both the Quantity to establish the correct relation between Quantity-I and Quantity-II and choose the correct option.
    A Quantity-I < Quantity-II Correct Answer Incorrect Answer
    B Quantity-I > Quantity-II Correct Answer Incorrect Answer
    C Quantity-I ≀ Quantity-II Correct Answer Incorrect Answer
    D Quantity-I β‰₯ Quantity-II Correct Answer Incorrect Answer
    E Quantity-I = Quantity-II or No relation Correct Answer Incorrect Answer

    Solution

    ATQ; Quantity I: According to the question; {(x Γ— 8)/(4800 Γ— 10)} = 2/3 Or, x = 4000 So, Quantity I = 4000 Quantity II: a = (3/2) Γ— 2000 = 3000 So, Quantity II = 3000 Therefore, Quantity I > Quantity II

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