Advertisements
Advertisements
प्रश्न
Factorize each of the following algebraic expression:
a2 + 14a + 48
Advertisements
उत्तर
\[\text{ To factorise }a^2 + 14a + 48, \text{ we will find two numbers p and q such that }p + q = 14\text{ and }pq = 48 . \]
Now,
\[8 + 6 = 14 \]
and
\[8 \times 6 = 48\]
\[\text{ Splitting the middle term 14a in the given quadratic as }8a + 6a,\text{ we get: }\]
\[ a^2 + 14a + 48 = a^2 + 8a + 6a + 48\]
\[ = ( a^2 + 8a) + (6a + 48)\]
\[ = a(a + 8) + 6(a + 8)\]
\[ = (a + 6)(a + 8)\]
APPEARS IN
संबंधित प्रश्न
Factorize each of the following algebraic expressions:
5(x − 2y)2 + 3(x − 2y)
Factorize each of the following algebraic expression:
16 − a6 + 4a3b3 − 4b6
Factorize each of the following algebraic expression:
a2 − 8ab + 16b2 − 25c2
Factorize each of the following algebraic expression:
a2 + 4b2 − 4ab − 4c2
Factorize each of the following algebraic expression:
a2 + 2a − 3
Factorise the following expression and write in the product form.
tr2s3
Factorise the following expression.
4x2 − 25y2
Factorise the following expression.
`9"x"^2-1/16"y"^2`
Factorise the following expressions and write them in the product form.
5t2
The value of m in the equation 8m = 56 is ________
