Take LHS: \[tan\text{ }\left( \pi /4\text{ }+\text{ }x \right)\text{ }+\text{ }tan\text{ }\left( \pi /4\text{ }\text{ }x \right)\] From formula, \[tan\text{ }\left( A+B \right)\text{ }=\text{...
Take LHS: \[co{{s}^{6}}~x\text{ }\text{ }si{{n}^{6}}~x\] From formula, \[{{\left( a\text{ }+\text{ }b \right)}^{~2}}~=\text{ }{{a}^{2}}~+\text{ }{{b}^{2}}~+\text{ }2ab\] \[{{a}^{3}}~\text{...
Take LHS: \[2(si{{n}^{6}}~x\text{ }+\text{ }co{{s}^{6}}~x)\text{ }\text{ }3(si{{n}^{4}}~x\text{ }+\text{ }co{{s}^{4}}~x)\text{ }+\text{ }1\] From formula, \[{{\left( a\text{ }+\text{ }b...
Take LHS: \[3{{\left( sin\text{ }x\text{ }\text{ }cos\text{ }x \right)}^{~4}}~+\text{ }6\text{ }{{\left( sin\text{ }x\text{ }+\text{ }cos\text{ }x \right)}^{~2}}~+\text{ }4\text{...
Take LHS: \[sin\text{ }4x\] From formula, \[sin\text{ 2}x\text{ }=\text{ }2\text{ }sin\text{ }x\text{ }cos\text{ }x\] \[cos\text{ }2x\text{ }=\text{ }co{{s}^{2}}~x\text{ }\text{ }si{{n}^{2}}~x\] So,...
Take LHS: \[cos\text{ }4x\] From formula, \[\text{ }cos\text{ }2x\text{ }=\text{ }2\text{ }co{{s}^{2}}~x\text{ }\text{ }1\] So, \[cos\text{ }4x\text{ }=\text{ }2\text{ }co{{s}^{2}}~2x\text{ }\text{...
Take LHS: \[co{{s}^{2}}~\left( \pi /4\text{ }\text{ }x \right)\text{ }\text{ }si{{n}^{2}}~\left( \pi /4\text{ }\text{ }x \right)\] From formula, \[co{{s}^{2}}~A\text{ }\text{ }si{{n}^{2}}~A\text{...
LHS: \[\left( sin\text{ }3x\text{ }+\text{ }sin\text{ }x \right)\text{ }sin\text{ }x\text{ }+\text{ }\left( cos\text{ }3x\text{ }\text{ }cos\text{ }x \right)\text{ }cos\text{ }x\] \[=\text{ }\left(...
Take RHS: \[4\text{ }(co{{s}^{6}}~x\text{ }\text{ }si{{n}^{6}}~x)\] By expanding we get, \[4\text{ }(co{{s}^{6}}~x\text{ }\text{ }si{{n}^{6}}~x)\text{ }=\text{ }4\text{...
Take LHS: \[1\text{ }+\text{ }co{{s}^{2}}~2x\] From formula, \[cos2x\text{ }=\text{ }co{{s}^{2}}~x\text{ }\text{ }si{{n}^{2}}~x\] \[co{{s}^{2}}~x\text{ }+\text{ }si{{n}^{2}}~x\text{ }=\text{ }1\]...
Take LHS: \[si{{n}^{2}}~\left( \pi /8\text{ }+\text{ }x/2 \right)\text{ }\text{ }si{{n}^{2}}~\left( \pi /8\text{ }\text{ }x/2 \right)\] From formula, \[\text{ }si{{n}^{2}}~A\text{ }\text{...
Take LHS: \[{{\left( cos\text{ }\alpha \text{ }+\text{ }cos\text{ }\beta \right)}^{2}}~+\text{ }{{\left( sin\text{ }\alpha \text{ }+\text{ }sin\text{ }\beta \right)}^{2}}\] By expanding we...
Take LHS: \[cos\text{ }x\text{ }/\text{ }\left( 1\text{ }\text{ }sin\text{ }x \right)\] From Formula, \[cos\text{ }2x\text{ }=\text{ }co{{s}^{2}}~x\text{ }\text{ }si{{n}^{2}}~x\] \[Cos\text{...
Take LHS: \[\begin{align} & cos\text{ }2x\text{ }/\text{ }\left( 1\text{ }+\text{ }sin\text{ }2x \right) \\ & \\ & \\ & \\ & \\ \end{align}\] From Formula, \[cos\text{...
Take LHS: \[\left[ sin\text{ }x\text{ }+\text{ }sin\text{ }2x \right]\text{ }/\text{ }\left[ 1\text{ }+\text{ }cos\text{ }x\text{ }+\text{ }cos\text{ }2x \right]\] From formulae, \[cos\text{...
Take LHS: \[\left[ 1\text{ }\text{ }cos\text{ }2x\text{ }+\text{ }sin\text{ }2x \right]\text{ }/\text{ }\left[ 1\text{ }+\text{ }cos\text{ }2x\text{ }+\text{ }sin\text{ }2x \right]\] From formulae,...
Take LHS: \[sin\text{ }2x\text{ }/\text{ }\left( 1\text{ }+\text{ }cos\text{ }2x \right)\] From formulae, \[cos\text{ }2x\text{ }=\text{ }1\text{ }\text{ }2\text{ }si{{n}^{2}}~x\] \[=\text{ }2\text{...
Take LHS: \[sin\text{ }2x\text{ }/\text{ }\left( 1\text{ }\text{ }cos\text{ }2x \right)\] From Formula, \[\text{ }cos\text{ }2x\text{ }=\text{ }1\text{ }\text{ }2\text{ }si{{n}^{2}}~x\], \[Sin\text{...
Let us consider LHS: \[\sqrt{\left[ \left( \mathbf{1}\text{ }\text{ }\mathbf{cos}\text{ }\mathbf{2x} \right)\text{ }/\text{ }\left( \mathbf{1}\text{ }+\text{ }\mathbf{cos}\text{ }\mathbf{2x} \right)...