Question

यदि |z₁| = |z₂| = ... = |z_n| = 1, तो दर्शाइए कि |z₁ + z₂ + z₃ + ... + z_n| = `|1/z_1 + 1/z_2 + 1/z_3 + ... + 1/z_n|`

Answer 1

पता है की |z₁| = |z₂| = ... = |z_n| = 1

⇒ |z₁|² = |z₂|² = ... = |z_n|² = 1  ......(i)

⇒ `z_1 barz_1 = z_2 barz_2 = ... = z_n barz_n` = 1  .....`[because zbarz = |z|^2]`

⇒ z₁ = `1/barz_1, z_2 = 1/barz_2 = ... = z_n = 1/barz_n`

और,

|z₁ + z₂ + z₃ + ... + z_n| = `|(z_1barz_1)/barz_1 + (z_2barz_2)/barz_2 + (z_3barz_3)/barz_3 + ... + (z_nbarz_n)/barz_n|`

= `||z_1|^2/barz_1 + (|z_2|^2)/barz_2 + (|z_3|^2)/barz_3 + ... + (|z_n|^2)/barz_n|`  ......`[zbarz = |z|^2]`

= `|1/barz_1 + 1/barz_2 + 1/barz_3 + ... + 1/barz_n|`  ......[(i) का उपयोग करके]

= `|bar(1/z_1 + 1/z_2 + 1/z_3 + ... + 1/z_n)|`  .....`[because barz_1 + barz_2 = bar(z_1 + z_2)]`

= `|1/z_1 + 1/z_2 + 1/z_3 + ... + 1/z_n|`  ....`[because |z| = |barz|]`

L.H.S. = R.H.S.

यह सिद्ध होता है कि

|z₁ + z₂ + z₃ + ... + z_n| = `|1/z_1 + 1/z_2 + 1/z_3 + ... + 1/z_n|`