If T_n = sin^n+cos^n,prove that (T_3-T_5)/T_1 = (T_5-T_7)/T_3
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If T_n = sin^n+cos^n,prove that (T_3-T_5)/T_1 = (T_5-T_7)/T_3
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Verified answer
Solution is in the attachment.
[tex]\large\underline{\sf{To\:prove-}} [/tex]
[tex]\rm :\longmapsto\:\dfrac{T_3 - T_5}{T_1} = \dfrac{T_5 - T_7}{T_3}[/tex]
[tex][\begin{gathered}\Large{\bold{{\underline{Formula \: Used - }}}} \end{gathered} [/tex]
[tex]\boxed{ \bf \: 1 - {sin}^{2}x = {cos}^{2}x} [/tex]
[tex]\boxed{ \bf \: 1 - {cos}^{2}x = {sin}^{2}x}[/tex]
[tex]\large\underline{\bf{Solution-}} [/tex]
Given that,
[tex]\rm :\longmapsto\:T_n = {sin}^{n}\theta \: + {cos}^{n}\theta[/tex]
Thus,
[tex]\rm :\longmapsto\:T_1 = {sin}^{}\theta \: + {cos}^{}\theta[/tex]
[tex]\rm :\longmapsto\:T_3 = {sin}^{3}\theta \: + {cos}^{3}\theta[/tex]
[tex]\rm :\longmapsto\:T_5 = {sin}^{5}\theta \: + {cos}^{5}\theta[/tex]
[tex]\rm :\longmapsto\:T_7 = {sin}^{7}\theta \: + {cos}^{7}\theta[/tex]
Now,
Consider,
[tex]\rm :\longmapsto\:\dfrac{T_3 - T_5}{T_1}[/tex]
[tex]\sf \: = \: \: \dfrac{({sin}^{3}\theta + {cos}^{3}\theta) - ( {sin}^{5}\theta + {cos}^{5} \theta)}{sin\theta + cos\theta} [/tex]
[tex]\sf \: = \: \: \dfrac{{sin}^{3}\theta + {cos}^{3}\theta - {sin}^{5}\theta - {cos}^{5} \theta}{sin\theta + cos\theta} [/tex]
[tex]\sf \: = \: \: \dfrac{{sin}^{3}\theta - {sin}^{5}\theta + {cos}^{3}\theta - {cos}^{5} \theta}{sin\theta + cos\theta} [/tex]
[tex]\sf \: = \: \: \dfrac{{sin}^{3}\theta(1 - {sin}^{2}\theta) + {cos}^{3}\theta(1 - {cos}^{2})\theta}{sin\theta + cos\theta} [/tex]
[tex]\sf \: = \: \: \dfrac{{sin}^{3}\theta {cos}^{2}\theta+{cos}^{3}\theta{sin}^{2}\theta}{sin\theta + cos\theta} [/tex]
[tex]\sf \: = \: \: \dfrac{{sin}^{2}\theta {cos}^{2}\theta({cos}^{}\theta + {sin}^{}\theta)}{sin\theta + cos\theta} [/tex]
[tex]\sf \: = \: \: {sin}^{2}\theta + {cos}^{2}\theta = sin [/tex]
[tex]\bf\implies \:\:\dfrac{T_3 - T_5}{T_1} = {sin}^{2}\theta {cos}^{2}\theta - - (1)[/tex]
Consider,
[tex]\rm :\longmapsto\:\dfrac{T_5 - T_7}{T_3}[/tex]
[tex]\sf \: = \: \: \dfrac{({sin}^{5}\theta + {cos}^{5}\theta) - ( {sin}^{7}\theta + {cos}^{7} \theta)}{ {sin}^{3}\theta + {cos}^{3}\theta} [/tex]
[tex]\sf \: = \: \: \dfrac{{sin}^{5}\theta + {cos}^{5}\theta-{sin}^{7}\theta - {cos}^{7} \theta}{ {sin}^{3}\theta + {cos}^{3}\theta} [/tex]
[tex]\sf \: = \: \: \dfrac{{sin}^{5}\theta - {sin}^{7}\theta + {cos}^{5}\theta - {cos}^{7} \theta}{ {sin}^{3}\theta + {cos}^{3}\theta} [/tex]
[tex]\sf \: = \: \: \dfrac{{sin}^{5}\theta(1 - {sin}^{2}\theta) + {cos}^{5}\theta(1 - {cos}^{2}\theta)}{ {sin}^{3}\theta + {cos}^{3}\theta} [/tex]
[tex]\sf \: = \: \: \dfrac{{sin}^{5}\theta{cos}^{2}\theta+ {cos}^{5}\theta{sin}^{2}\theta}{ {sin}^{3}\theta + {cos}^{3}\theta} [/tex]
[tex]\sf \: = \: \: \dfrac{{sin}^{2}\theta{cos}^{2}\theta \: ({cos}^{3}\theta + {sin}^{3}\theta)}{ {sin}^{3}\theta + {cos}^{3}\theta} [/tex]
[tex]\sf \: = \: \: {sin}^{2}\theta {cos}^{2}\theta = sin [/tex]
[tex]\bf\implies \:\:\dfrac{T_5 - T_7}{T_3} = {sin}^{2}\theta {cos}^{2}\theta - - (2)[/tex]
Hence,
From equation (1) and equation (2), concluded that
[tex]\bf :\longmapsto\:\dfrac{T_3 - T_5}{T_1} = \dfrac{T_5 - T_7}{T_3}[/tex]
[tex]{\boxed{\boxed{\bf{Hence, Proved}}}} [/tex]