Question
In a division sum, the divisor is 9 times the quotient
and also 3 times of the remainder. If the remainder is 45, then the dividend is:Solution
Given that remainder = 45 Here Divisor = 9×Quotient = 3× Remainder = 3×45= 135 So divisor = 135 & divisor = 9×Quotient so Quotient = 135/9 = 15 Hence Dividend = Divisor × Quotient + Remainder So Dividend = 135×15 + 45 = 2025 + 45 = 2070.
In the question, two equations I and II are given. You have to solve both the equations to establish the correct relation between 'p' and 'q' and choose...
I. x2 – 9x + 18 = 0
II. y2 – 5y + 6 = 0
I. 2x2 – 10x – 48 = 0
II. y2 – 16y – 297 = 0
I. 165x² + 97x + 10 = 0
II. 117y² - 163y + 56 = 0
Solve the quadratic equations and determine the relation between x and y:
Equation 1: x² - 24x + 143 = 0
Equation 2: y² - 26y + 165 = 0
Equation 1: x² - 90x + 2025 = 0
Equation 2: y² - 88y + 1936 = 0
If α, β are the roots of the equation x² – px + q = 0, then the value of α2+β2+2αβ is
...I. 27x² + 120x + 77 = 0
II. 56y² + 117y + 36 = 0
I. 96x² + 52x - 63 = 0
II. 77y² + 155y + 72 = 0
I. √(17x) + √51 = 0
II. √(4y) + 3 = 0
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