Mathematics

Evaluate the following using suitable identities:
(i) (99)³
(ii) (102)³
(iii) (998)³

Polynomials

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Answer

(i) (99)³

We can write it as,

= (100 - 1)³

We know that,

(a - b)³ = (a)³ - (b)³ - 3ab(a - b)

Putting a = 100 , b = 1

= (100)³ - (1)³ - 3 x 100 x 1(100 - 1)

= 1000000 - 1 - 300 x 99

= 1000000 - 1 - 29700

= 970299

Hence, (99)³ = 970299

(ii) (102)³

We can write it as,

= (100 + 2)³

We know that,

(a + b)³ = (a)³ + (b)³ + 3ab(a + b)

Putting a = 100 , b = 2

= (100)³ + (2)³ + 3 x 100 x 2(100 + 2)

= 1000000 + 8 + 600 x 102

= 1000000 + 8 + 61200

= 1061208

Hence, (102)³ = 1061208

(iii) (998)³

We can write it as,

= (1000 - 2)³

We know that,

(a - b)³ = (a)³ - (b)³ - 3ab(a - b)

Putting a = 1000 , b = 2

= (1000)³ - (2)³ - 3 x 1000 x 2(1000 - 2)

= 1000000000 - 8 - 6000 x 998

= 1000000000 - 8 - 5988000

= 994011992

Hence, (998)³ = 994011992

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Mathematics

Evaluate the following using suitable identities:
(i) (99)³
(ii) (102)³
(iii) (998)³

Polynomials

Answer

Related Questions

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Write the following cubes in expanded form:
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Factorise each of the following:
(i) 8a³ + b³ + 12a²b + 6ab²
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(v) 27p³ - $\dfrac{1}{216}$ - $\dfrac{9}{2}$ p² + $\dfrac{1}{4}$ p

Verify :
(i) x³ + y³ = (x + y) (x² - xy + y²)
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Mathematics

Evaluate the following using suitable identities:(i) (99)3(ii) (102)3(iii) (998)3

Polynomials

Answer

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Verify :(i) x3 + y3 = (x + y) (x2 - xy + y2)(ii) x3 - y3 = (x - y) (x2 + xy + y2)

Evaluate the following using suitable identities:
(i) (99)³
(ii) (102)³
(iii) (998)³

Factorise:
(i) 4x² + 9y² + 16z² + 12xy - 24yz - 16xz
(ii) 2x² + y² + 8z² - $2\sqrt{2}$ xy + $4\sqrt{2}$ yz - 8xz

Write the following cubes in expanded form:
(i) (2x + 1)³
(ii) (2a - 3b)³
(iii) $\Big[\dfrac{3x}{2} + 1\Big]^3$
(iv) $\Big[x - \dfrac{2}{3}y\Big]^3$

Factorise each of the following:
(i) 8a³ + b³ + 12a²b + 6ab²
(ii) 8a³ - b³ - 12a²b + 6ab²
(iii) 27 - 125a³ - 135a + 225a²
(iv) 64a³ - 27b³ - 144a²b + 108ab²
(v) 27p³ - $\dfrac{1}{216}$ - $\dfrac{9}{2}$ p² + $\dfrac{1}{4}$ p

Verify :
(i) x³ + y³ = (x + y) (x² - xy + y²)
(ii) x³ - y³ = (x - y) (x² + xy + y²)