(x) The Given expression is a 2 – 21a + 90.īy comparing the given expression a 2 – 21a + 90 with the basic expression x^2 + ax + b. The product of two number is m * n = a * c = 1 * (16) = 16 = -16 * -1įrom the above two instructions, we can write the values of two numbers m and n as -16 and -1. The sum of two numbers is m + n = b = -17 = -16 – 1. (ix) The Given expression is a 2 – 17a + 16.īy comparing the given expression a 2 – 17a + 16 with the basic expression x^2 + ax + b. The product of two number is m * n = a * c = 1 * (42) = 42 = -21 * -2įrom the above two instructions, we can write the values of two numbers m and n as -21 and -2. The sum of two numbers is m + n = b = -23 = -21 – 2. (viii) The Given expression is a 2 – 23a + 42.īy comparing the given expression a 2 – 23a + 42 with the basic expression x^2 + ax + b. The product of two number is m * n = a * c = 1 * (24) = 24 = -6 * -4įrom the above two instructions, we can write the values of two numbers m and n as -6 and -4. The sum of two numbers is m + n = b = -10 = -6 – 4. (vii) The Given expression is a 2 – 10a + 24.īy comparing the given expression a 2 – 10a + 24 with the basic expression x^2 + ax + b. The product of two number is m * n = a * c = 1 * (40) = 40 = 8 * 5įrom the above two instructions, we can write the values of two numbers m and n as 8 and 5. The sum of two numbers is m + n = b = 13 = 8 + 5. (vi) The Given expression is a 2 + 13a + 40.īy comparing the given expression a 2 + 13a + 40 with the basic expression x^2 + ax + b. The product of two number is m * n = a * c = 1 * (60) = 60 = 15 * 4įrom the above two instructions, we can write the values of two numbers m and n as 15 and 4. The sum of two numbers is m + n = b = 19 = 15 + 4. (v) The Given expression is a 2 + 19a + 60.īy comparing the given expression a 2 + 19a + 60 with the basic expression x^2 + ax + b. The product of two number is m * n = a * c = 1 * (56) = 56 = 8 * 7įrom the above two instructions, we can write the values of two numbers m and n as 8 and 7.
The sum of two numbers is m + n = b = 15 = 8 + 7. (iv) The Given expression is a 2 + 15a + 56.īy comparing the given expression a 2 + 15a + 56 with the basic expression x^2 + ax + b. The product of two number is m * n = a * c = 1 * (27) = 27 = 9 * 3įrom the above two instructions, we can write the values of two numbers m and n as 9 and 3. The sum of two numbers is m + n = b = 12 = 9 + 3. (iii) The Given expression is a 2 + 12a + 27.īy comparing the given expression a 2 + 12a + 27 with the basic expression x^2 + ax + b. The product of two number is m * n = a * c = 1 * (24) = 24 = 6 * 4įrom the above two instructions, we can write the values of two numbers m and n as 6 and 4. The sum of two numbers is m + n = b = 10 = 6 + 4. (ii) The Given expression is a 2 + 10a + 24. The product of two number is m * n = a * c = 1 * (6) = 6 = 3 * 2įrom the above two instructions, we can write the values of two numbers m and n as 3 and 2. The sum of two numbers is m + n = b = 5 = 3 + 2. (i) The Given expression is a 2 + 5a + 6.īy comparing the given expression a 2 + 5a + 6 with the basic expression x^2 + ax + b. Also, to learn complete factorization problems, check Factorization Worksheets, and improve your preparation level. Solve all problems to get a complete grip on the Factorization of Quadratic Trinomials problems. We have given different problems according to the updated syllabus on Factoring and Solving Quadratic Equations Worksheets. The best resource to learn Factorization of Quadratic Trinomials Problems is Worksheet on Factoring Quadratic Trinomials.
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