Additionstheoreme für sin(x) und cos(x) verwenden. Behauptung cos(x)+cos(y)=2cos((x+y)/2)*cos((x-y)/2)

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Ein anderes Problem?

mathef · Answer 1 · 2017-11-30T13:20:49+0000

2 * COS ((X+Y)/2) * COS ((X-Y)/2)

= 2 * COS (X/2+Y/2) * COS (X/2-Y/2)

= 2 * ( COS (X/2) * COS(Y/2) - SIN (X/2) * SIN(Y/2) ) *( COS (X/2) * COS(Y/2) + SIN (X/2) * SIN(Y/2) )

3. binomi. Formel

=2 * ( COS² (X/2) * COS²(Y/2) - SIN² (X/2) * SIN²(Y/2) )

= 2* ( COS² (X/2) * COS²(Y/2) - (1 - COS² (X/2)) * (1 - COS²(Y/2) ) )

= 2* ( COS² (X/2) * COS²(Y/2) - (1 - COS² (X/2) - COS²(Y/2) + COS² (X/2) * COS²(Y/2) ) )

= 2* ( COS² (X/2) * COS²(Y/2) - 1 + COS² (X/2) + COS²(Y/2) - COS² (X/2) * COS²(Y/2) )

= 2* ( - 1 + COS² (X/2) + COS²(Y/2) )

= - 2 + 2*COS² (X/2) + 2*COS²(Y/2)

jetzt die Formel für den halben Winkel anwenden

cos( x/2) = ±√ ( ( 1 -cos(a) ) / 2 ) gibt

= - 2 + 2*(1+COS (X)) /2 + 2*(1+COS (y)) /2

= COS(X) + COS(Y) q.e.d.