Math, asked by wwwomshankerprasad79, 6 months ago

factorise
p2 - 25

Answers

Answered by Anonymous
2

Step-by-step explanation:

p²-5²=p²-25

by a²-b²=(a+b)(a-b)

so a=p and b=5

therefore,

p²-5²=(p+5)(p-5)

hope this would be helpful for you ☺️

Answered by sanjeevpanghal
0

Answer:

EXERCISE: 14.1

1. Find the common factos of the given terms:

(i) 12x, 36

(ii) 2y, 22xy

(iii) 14pq, 28p2q2

(iv) 2x, 3x2, 4

(v) 6abc, 24ab2, 12a2b

(vi) 16x3, –4x2, 32x

(vii) 10pq, 20qr, 30rp

(viii) 3x2y3, 10x3y2, 6x2y2z

Sol. (i) The numerical coefficient in the given monomials are 12 and 36.

The highest common factor of 12 and 36 is 12.

But there is no common literal appearing in the given monomials 12x and 36.

The highest common factor = 12.

(ii) 2y = 2 × y

22xy = 2 × 11× x × y

The comoon factors are 2, y

And, 2 × y = 2y

(iii) The numerical coefficients of the given monomials are 14 and 28.

The highest common factor of 14 and 28 is 14.

The common literals appearing in the given monomials are p and q.

The smallest power of p and q in the two monomials = 1

The monomial of common literals with smallest powers = pq

∴The highest common factor = 14pq

(iv) 2x = 2 × x

3x2 = 3 × x × x

4 = 2 × 2

The common factor is 1.

(v) The numerical coefficients of the given monomials are 6, 24 and 12.

The common literals appearing in the three monomials are a and b.

The smallest power of a in the three monomials = 1

The smallest power of b in the three monomials = 1

The monomial of common literals with smallest power = ab

Hence, the highest common factor = 6ab

(vi) 16x3 = 2 × 2 × 2 2 x × x × x

–4x2 = –1 × 2 × 2 x × x

32x = 2 × 2 × 2 × 2 × 2 × x

The common factors are 2, 2, x.

And 2 × 2 × x = 4x

(vii) The numerical coefficients of the given monomials are 10, 20 and 30

The highest common factor of 10, 20 and 30 is 10

There is no common literal appearing in the three monomials.

(viii) 3x2y2 = 3 × x × x × y × y × y

10x3y2 = 2 × 5 × x × x × x × y × y

6x2y2z = 2 × 3 × x × x × y × y × z

The common factors are x, x, y, y

And

x × x × y ×y

2. Factorise the following expressions

(i) 7x – 42

(ii) 6p – 12q

(iii) 7a2 + 14a

(iv) –16z + 20z3

(v) 20l2m + 30alm

(vi) 5x2y – 15xy2

(vii) 10a2 – 15b2 + 20c2

(viii) – 4a2 + 4ab – 4ca

(x) ax2y + bxy2 + cxyz

Sol. (i) Whe have 7x = 7 × x and 42 = 2 × 3 × 7

The two terms have 7 as a common factor

7x – 42 = (7 × x) – 2 × 3 × 7

= 7 × (x – 2 × 3) = 7(x – 6)

(ii) 6p = 2 × 3 × p

12q = 2 × 2 × 3 × q

The common factors are 2 and 3.

∴6p – 12q = (2 × 3 × p) – (2 × 2 × 3 × q)

= 2 × 3[p – (2 × q)]

= 6(p – 2q)

(iii) We have, 7a2 = 7 × a × a

and , 14a = 2 × 7 × a

The two terms have 7 and a as common factors

7a2 + 14a = (7 × a × a) + (2 × 7 × a)

= 7 × a × (a + 2) = 7a(a + 2)

(iv) 16z = 2 × 2 × 2 × 2 × z

20z3 = 2 × 2 × 5 × z × z × z

The common factors are 2, 2, and z.

∴ –16z + 20z3 = –(2 × 2 × 2 × 2 × z)

+ (2 × 2 × 5 × z × z × z

= (2 × 2 × z)[–(2 × 2) + (5 × z × z)]

= 4z(– 4 + 5z2)

(v) We have, 20l2m = 2 × 2 × 5 × l × l × m

and, 30alm = 3 × 2 × 5 × a × l × m

The two terms have 2, 5, l and m as common factors.

∴ 20 l2m+ 30alm = (2 × 2 × 5 × l × l × m)

+ (3 × 2 × 5 × a × l × m)

= 2 × 5 × l × m × (2 × l + 3 × a)

= 10lm(2l + 3a)

(vi) 5x2y = 5 × x × x × y

15xy2 = 3 × 5 × x × y × y

The common factors are 5, x, and y.

∴5x2y – 15xy2 = (5 × x × x × y)

– (3 × 5 × x × y × y)

= 5 × x × y[x – (3 × y)]

= 5xy(x – 3y)

(vii) We have, 10a2 = 2 × 5 × a × a,

15b2 = 3 × 5 × b × b

and 20c2 = 2 × 2 × 5 × c × c

The three terms have 5 as a common factor

10a2 – 15b2 + 20c2 = (2 × 5 × a × a)

– (3 × 5 × b × b) + (2 × 2 × 5 × c × c)

= 5 × (2 × a × a – 3 × b × b + 4 × c × c)

= 5(2a2 – 3b2 + 4c2)

(viii) We have, 4a2 = 2 × 2 × a × a,

4ab = 2 × 2 × a × b

and, 4ca = 2 × 2 × c × a

The three terms have 2, 2 and a as common factors

∴–4a2 + 4ab – 4ca = – (2 × 2 × a × a)

+ (2 × 2 × a × b) – (2 × 2 × c × a)

= 2 × 2 × a × (–a + b – c)

= 4a(–a + b – c)

(ix) x2yz = x × x × y × z

xy2z = x × y × y × z

xyz2 = x × y × z × z

The common factors are x, y, and z.

∴ x2yz + xy2z + xyz2 = (x × x × y × z) + (x × y × y × z) + (x × y × z × z)

= xyz(x + y + z)

(x) We have, ax2y = a × x × x × y

bxy2 = b × x × y × y

and, cxyz = c × x × y × z

The three terms have x andy as common factors.

ax2y + bxy2 + cxyz = (a × x × x × y)

+ (b × x × y × y) + (c × x × y × z)

= x × y × (a × x + b × y + c × z)

= xy(ax + by + cz)

3. Factorize:

(i) x2 + xy + 8x + 8y

(ii) 15xy – 6x + 5y – 2

(iii) ax + bx – ay – by

(iv) 15pq + 15 + 9q + 25p

(v) z – 7 + 7xy – xyz

Sol. (i) (i) x2 + xy + 8x + 8y = (x2 + xy) + (8x + 8y) = x(x + y) + 8(x + y)

= (x + y)(x + 8)

[Taking (x + y) common]

(ii) 15xy – 6x + 5y – 2

= 3 × 5 × x × y – 3 × 2 × x + 5 × y – 2

= 3x(5y – 2) + 1(5y – 2)

= (5y – 2)(3x + 1)

(iii) ax + bx – ay – by = (ax + bx) – (ay + by)

[Grouping the terms]

= (a + b)x – (a + b)y

= (a + b)(x – y)

[Taking (a + b) common]

(iv) (iv) 15pq + 15 + 9q + 25p

= 15pq + 9q + 25p + 15

= 3 × 5 × p × q + 3 × 3 × q + 5 × 5 × p + 3 × 5

= 3q(5p + 3) + 5(5p + 3)

= (5p + 3)(3q + 5)

(v) z – 7 + 7xy – xyz

= z – 7 – xyz + 7xy

= 1(z – 7) – xy(z – 7)

= (z – 7)(1 – xy)

[Taking z – 7 common]

Step-by-step explanation:

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