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Algebra.Com's Answer #492413 by jsmallt9(3758)![\"\"](\"/images/stars/stars-13.gif\")   You can put this solution on YOUR website! When verifying identities some of the things to do are:
\n" ); document.write( "Changing arguments of trig functions are done through trig identities. In Trig you learn a lot of identities:
\n" ); document.write( "So even though we have no well-known identity for sin(4x), we do have an identity we can use on it. The identity sin(2x) = 2sin(x)cos(x) can be used. It tells us that the sine of anything is equal to 2 times (the sine of half of the anything) times the cosine of half of the anything. So we can use it on sin(4x) (where \"anything\" = 4x and \"half of anything\" = 2x: \n" ); document.write( " \n" ); document.write( "We still have some argument changing to do. The 2x's need to be x's. We can use sin(2x) again (more obviously this time) to change the argument of sin(2x). We can use cos(2x) to change the argument of cos(2x) to x. There are three variations of cos(2x): \n" ); document.write( " \n" ); document.write( "The arguments are now x's. Let's multiply this out to see how close we are to the end: \n" ); document.write( " \n" ); document.write( " \n" ); document.write( "And look at how close we got! All we have to do is use the Commutative Property on the second term to get the factors in the same order as they are on the right: \n" ); document.write( " |