Show that (x + 2y)2 – (x – 2y)2 = 8xy.

1.	Show that (x + 2y)2 – (x – 2y)2 = 8xy.
Answer» LHS = (x + 2y)² – (x – 2y)² = x² + (2 (x) x (x) 2y) + (2y)² – [x² – (2 (x) x (x) 2y) + (2y)²] = x² + 4xy + 4y² – [x² – 4xy + 2²y²] = x² + 4xy + 4y² – x² + 4xy – 4y² = x² – x² + 4xy + 4xy + 4y² – 4y² = x² (1 – 1) + xy (4 + 4) + y² (4 – 4) = 0x² + 8xy + 0y² = 8xy = RHS ∴ (x + 2y)² – (x – 2y)² = 8xy [∵ (a + b)² = a² + 2ab + b² (a – b)² = a² – 2ab + b²]

Answer»

LHS = (x + 2y)² – (x – 2y)²

= x² + (2 (x) x (x) 2y) + (2y)² – [x² – (2 (x) x (x) 2y) + (2y)²]

= x² + 4xy + 4y² – [x² – 4xy + 2²y²]

= x² + 4xy + 4y² – x² + 4xy – 4y²

= x² – x² + 4xy + 4xy + 4y² – 4y²

= x² (1 – 1) + xy (4 + 4) + y² (4 – 4)

= 0x² + 8xy + 0y²

= 8xy

= RHS

∴ (x + 2y)² – (x – 2y)² = 8xy

[∵ (a + b)² = a² + 2ab + b² (a – b)² = a² – 2ab + b²]

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