A quadratic equation is an expression of the form ax2 + bx + c = 0 in which a, b & c are numerals; and also the highest power of x is 2 & that the power of x will neither be fractions nor negatives. Quadratic equations can be solved using the method of factorization, completing the square, quadratic formula& graphical method
Steps in solving quadratic equation: (1)examine the middle term whose power of x is 1. (2) Find the product of the first & last term. (3) Find two terms whose sum is equal to the middle term & product is equal to the value of the product of the first & last term (4) Replace the middle term by two the two terms in step 3. (5) Factorize the first two & last two terms (6) equate the linear factors to zero to find the value of x.
Example – Solve by factorization: X2 + 7X + 10 = 0
Solution
X2 + 7X + 10 = 0
X2 +2X + 5X + 10 = 0
X(X + 2) + 5(X + 2) = 0
(X+2) (X + 5) = 0
X + 2 = 0
X = -2 OR
X + 5 = 0
X = -5
Hence X = -2 or -5
Factorization of Quadratic Expressions.
Factorize the following:
- 6a2 + 15a + 9
- 6a2 – 19ax – 36x2
- (5x – 1) ( x – 3) – ( x – 5) ( x – 3)
- 35 – 2b – b2
- x2 – y2 + ( x + y ) 2
- 25a2 – 4 ( a – 2b ) 2.
Solutions.
6a2 + 15x + 9.
Since 3 is a common factor to all the terms, first take out 3 as the common factor:
6a2 + 15a + 9 = 3 (2a2+ 5a + 3)
= 3 (2a2 + 2a + 3a + 3)
= 3 (2a (a+1) + 3 (a+1)
= 3 ( (a+1) (2a+ 3)).
Hence.
6a2 + 15a + 9 = 3 (a+ 1) (2a + 3)
= 3 (a+1) ( 2a + 3)
- 6a2 – 19ax – 36x2
1st step: Find the product of the first and last terms.
6a2 x -36x2 = -216a2x2
2nd step: Find two terms such that their products is – 216a2x and their sum is -19ax ( the middle term).
Factors of -216a2x2 sum of factors .
- +27ax and -8ax + 19ax
- -27ax and +8ax – 19ax
- +9ac and -24ax – 15ax
- -9x and 24ax + 15ax.
Of these only b gives the required result.
3rd step: Replace -19ax in the given expression by -27ax and 8ax then factorize by grouping:
6a2 – 19ax – 36x2
= 6a2 – 27ax + 8ax – 36x2
= 3a (2a – 9x) + 4x (2a-9x)
=(2a – 9x ) ( 3a + 4x)
hence,
6a2 – 19ax – 36x2 = (2a -9x) (3a + 4x)
- (5x – 1 (x -3) – (x -5)(x – 3)
= (x – 3) ( 5x -1) – (x – 5)
= ( x -3) ( 5x – 1 – x + 5 )
= ( x – 3) ( 5x – x + 5 – 1)
= ( x – 3) ( 4x + 4)
= ( x – 3) + ( x + 1)
= ( x -3) 4(x+1)
= 4(x-3) (x+1)
- 35 – 2b –b2
or – b2 – 2b + 35
= -b2 – 7b + 5b + 35
= -b (b+7) + 5 (b + 7)
= (b+7) ( -b + 5)
= (b+7) ( 5-b)
or (7+b) ( 5 – b)
- x2 – y2 + (x + y)2
Since
X2 – y2 = (x)2 – (y)2
= ( x + y) ( x –y)
then x2 – y2 + (x + y)2 = (x + y)(x-y) + (x+ y)2
= (x +y)( x-y + (x + y)
= (x + y ( x –y + x + y)
= ( x + y ) ( x + x
= (x + y) (2x)
(x +y ) (2x) = 2x ( x +y)
EVALUATION (USE THE BOX AT THE BOTTOM TO POST YOUR ANSWER FOR DISCUSSION AND APPRAISAL).
Factorize the following
- m2 – 15mm – 54n2
- 8a2 – 18b2
- If 17x = 37 52 – 3562
Find the value of x
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