Answer : Given: g = {(1, 2), (2, 5), (3, 8), (4, 10), (5, 12), (6, 12)} We know that, A function ‘f’ from set A to set B is a correspondence (rule) which associates elements of set A to elements of...
Prove that: sin2 π/18 + sin2 π/9 + sin2 7π/18 + sin2 4π/9 = 2
Let us consider LHS: \[si{{n}^{2}}~\pi /18\text{ }+\text{ }si{{n}^{2}}~\pi /9\] \[+\text{ }si{{n}^{2}}~7\pi /18\text{ }+\text{ }si{{n}^{2}}~4\pi /9\] Or, \[si{{n}^{2}}~\pi /18\text{ }+\text{...
Prove that:
Solution: As per the given question, \[1\text{ }=\text{ }RHS\] \[\therefore LHS\text{ }=\text{ }RHS\] Hence proved.
Prove that:
(i) (ii) Solution: (i) \[1\text{ }=\text{ }RHS\] \[\therefore LHS\text{ }=\text{ }RHS\] Hence proved. (ii) \[\left\{ 1+cotx\left-( -cosecx \right) \right\}\left\{ 1+cotx+\left( -cosecx \right)...
Prove that:
(i) (ii) Solution: (i) \[1\text{ }=\text{ }RHS\] \[\therefore LHS\text{ }=\text{ }RHS\] Hence proved. (ii) \[1\text{ }+\text{ }1\] \[2\text{ }=\text{ }RHS\] \[\therefore LHS\text{ }=\text{...
Prove that: 3 sin π/6 sec π/3 – 4 sin 5π/6 cot π/4 = 1
(i) \[3\text{ }sin\text{ }\pi /6\text{ }sec\text{ }\pi /3\text{ }-\text{ }4\text{ }sin\text{ }5\pi /6\text{ }cot\text{ }\pi /4\text{ }=\text{ }1\] Let us consider LHS: \[3\text{ }sin\text{ }\pi...
Prove that: (i) cos 570o sin 510o + sin (-330o) cos (-390o) = 0 (ii) tan 11π/3 – 2 sin 4π/6 – 3/4 cosec2 π/4 + 4 cos2 17π/6 = (3 – 4√3)/2
(i) \[cos\text{ }{{570}^{o}}~sin\text{ }{{510}^{o}}~+\text{ }sin\text{ }(-{{330}^{o}})\text{ }cos\text{ }(-{{390}^{o}})\] \[=\text{ }0\] Let us consider LHS: \[cos\text{ }{{570}^{o}}~sin\text{...
Prove that: (i) cos 24o + cos 55o + cos 125o + cos 204o + cos 300o = 1/2 (ii) tan (-125o) cot (-405o) – tan (-765o) cot (675o) = 0
(i) \[cos\text{ }{{24}^{o}}~+\text{ }cos\text{ }{{55}^{o}}~+\text{ }cos\text{ }{{125}^{o}}~+\text{ }cos\text{ }{{204}^{o}}~\] \[~+\text{ }cos\text{ }{{300}^{o}}~=\text{ }1/2\] Let us consider LHS:...
Prove that: (i) tan 225o cot 405o + tan 765o cot 675o = 0 (ii) sin 8π/3 cos 23π/6 + cos 13π/3 sin 35π/6 = 1/2
(i) \[tan\text{ }{{225}^{o}}~cot\text{ }{{405}^{o}}~+\text{ }tan\text{ }{{765}^{o}}~cot\text{ }{{675}^{o}}~=\text{ }0\] Let us consider LHS: \[tan\text{ }225{}^\circ ~\text{ }cot\text{ }405{}^\circ...
Find the values of the following trigonometric ratios: (i) cos 39π/4 (ii) sin 151π/6
(i) \[cos\text{ }39\pi /4\] \[cos\text{ }39\pi /4\text{ }=\text{ }cos\text{ }{{1755}^{o}}\] \[=\text{ }cos\text{ }{{\left( 90\times 19\text{ }+\text{ }45 \right)}^{o}}\] Since,\[{{1755}^{o}}\] lies...
Find the values of the following trigonometric ratios: (i) cos 19π/4 (ii) sin 41π/4
(i) \[cos\text{ }19\pi /4\] \[cos\text{ }19\pi /4\text{ }=\text{ }cos\text{ }{{855}^{o}}\] \[=\text{ }cos\text{ }{{\left( 90\times 9\text{ }+\text{ }45 \right)}^{o}}\] Since,\[{{855}^{o}}\] lies in...
Find the values of the following trigonometric ratios: (i) cosec (-20π/3) (ii) tan (-13π/4)
(i) \[cosec\text{ }\left( -20\pi /3 \right)\] \[cosec\text{ }\left( -20\pi /3 \right)\] \[=\text{ }cosec\text{ }{{\left( -1200 \right)}^{o}}\] Or, \[=\text{ }-\text{ }cosec\text{ }{{\left( 1200...
Find the values of the following trigonometric ratios: (i) cos 19π/6 (ii) sin (-11π/6)
(i) \[cos\text{ }19\pi /6\] \[cos\text{ }19\pi /6\text{ }=\text{ }cos\text{ }{{570}^{o}}\] \[=\text{ }cos\text{ }{{\left( 90\times 6\text{ }+\text{ }30 \right)}^{o}}\] Since,\[{{570}^{o}}\] lies in...
Find the values of the following trigonometric ratios: (i) tan 7π/4 (ii) sin 17π/6
(i) \[tan\text{ }7\pi /4\] \[tan\text{ }7\pi /4\text{ }=\text{ }tan\text{ }{{315}^{o}}\] \[=\text{ }tan\text{ }{{\left( 90\times 3\text{ }+\text{ }45 \right)}^{o}}\] Since,\[{{315}^{o}}\] lies in...
Find the values of the following trigonometric ratios: (i) tan 11π/6 (ii) cos (-25π/4)
(i) \[tan\text{ }11\pi /6\] \[tan\text{ }11\pi /6\text{ }=\text{ }{{\left( 11/6\text{ }\times \text{ }180 \right)}^{o}}\] \[=\text{ }{{330}^{o}}\] Since,\[{{330}^{o}}\] lies in the \[IV\text{...
Find the values of the following trigonometric ratios: (i) sin 5π/3 (ii) sin 17π
(i) \[sin\text{ }5\pi /3\] \[5\pi /3\text{ }=\text{ }{{\left( 5\pi /3\text{ }\times \text{ }180 \right)}^{o}}\] \[=\text{ }{{300}^{o}}\] Or, \[=\text{ }{{\left( 90\times 3\text{ }+\text{ }30...