Expand each of the following, using suitable identities:

(i) (x + 2y + 4z)²

(ii) (2x - y + z)²

(iii) (-2x + 3y + 2z)²

(iv) (3a - 7b - c)²

(v) (-2x + 5y - 3z)²

(vi) $\Big[\dfrac{1}{4}a - \dfrac{1}{2}b + 1\Big]^2$

(i) (x + 2y + 4z)²

[∵ (x + y + z)² = x² + y² + z² + 2xy + 2yz + 2zx]

Putting x = x, y = 2y, z = 4z

= (x)² + (2y)² + (4z)² + 2(x)(2y) + 2(2y)(4z) + 2(4z)(x)

= x² + 4y² + 16z² + 4xy + 16yz + 8zx

(ii) (2x - y + z)²

[∵ (x + y + z)² = x² + y² + z² + 2xy + 2yz + 2zx]

Putting x = 2x, y = (-y), z = z

= (2x)² + (-y)² + (z)² + 2(2x)(-y) + 2(-y)(z) + 2(z)(2x)

= 4x² + y² + z² - 4xy - 2yz + 4zx

(iii) (-2x + 3y + 2z)²

[∵ (x + y + z)² = x² + y² + z² + 2xy + 2yz + 2zx]

Putting x = -2x, y = 3y, z = 2z

= (-2x)² + (3y)² + (2z)² + 2(-2x)(3y) + 2(3y)(2z) + 2(2z)(-2x)

= 4x² + 9y² + 4z² - 12xy + 12yz - 8zx

(iv) (3a - 7b - c)²

[∵ (x + y + z)² = x² + y² + z² + 2xy + 2yz + 2zx]

Putting x = 3a, y = (-7b), z = (-c)

= (3a)² + (-7b)² + (-c)² + 2(3a)(-7b) + 2(-7b)(-c) + 2(-c)(3a)

= 9a² + 49b² + c² - 42ab + 14bc - 6ac

(v) (-2x + 5y - 3z)²

[∵ (x + y + z)² = x² + y² + z² + 2xy + 2yz + 2zx]

Putting x = -2x, y = 5y, z = (-3z)

= (-2x)² + (5y)² + (-3z)² + 2(-2x)(5y) + 2(5y)(-3z) + 2(-3z)(-2x)

= 4x² + 25y² + 9z² - 20xy - 30yz + 12zx

(vi) $\Big[\dfrac{1}{4}a - \dfrac{1}{2}b + 1\Big]^2$

[∵ (x + y + z)² = x² + y² + z² + 2xy + 2yz + 2zx]

Putting x = $\dfrac{a}{4}, y = -\dfrac{b}{2}$, z = 1

$= \Big(\dfrac{a}{4}\Big)^2 + \Big(-\dfrac{b}{2}\Big)^2 + (1)^2 + 2\Big(\dfrac{a}{4}\Big) \Big(-\dfrac{b}{2}\Big) + 2\Big(-\dfrac{b}{2}\Big)(1) + 2(1) \Big(\dfrac{a}{4}\Big) \\[1em] = \dfrac{a^2}{16} + \dfrac{b^2}{4} + 1 - \dfrac{ab}{4} -b + \dfrac{a}{2}$