Proof of sin(θ-Φ)=sinθcosΦ-cosθsinΦ using vector algebra

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Jamiemma1995
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Homework Statement

given two unit vectors a= cosθi + sinθi b=cosΦi+sinΦj prove that sin(θ-Φ)=sinθcosΦ-cosΦsinθ using vector algebra[/B]

Homework Equations

sin(θ-Φ)=sinθcosΦ-cosΦsinθ[/B]

The Attempt at a Solution

axb= (cosθsinΦ-cosΦsinθ)k and I'm guessing that the change in sign has something to do with the fact that k is perpendicular to the vectors I'm usingΦ-θ[/B]
 
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Jamiemma1995 said:

The Attempt at a Solution

axb= (cosθsinΦ-cosΦsinθ)k and I'm guessing that the change in sign has something to do with the fact that k is perpendicular to the vectors I'm usingΦ-θ[/B]
The vectors a and b have zero "z" component. Remember how the components of the cross product are calculated.
 
ehild said:
The vectors a and b have zero "z" component. Remember how the components of the cross product are calculated.
when I calculated the components I got axb = ( cosθi +sinθj )x(cosΦi + sinΦj) axb=cosθcosΦixi + cosθsinΦixj +sinθcosΦjxi +sinθsinΦjxj ixi=1x1xsino=0 jxjxsin0=0 ixj=1x1sin90=1 and jxi=-1 because AxB=-BxA and was then left with axb= cosθsinΦ(1) + sinθcosΦ(-1)=cosθsinΦ -sinθcosΦ but its supposed to be the other way around, I don't understand where I'm going wrong :(
 
ehild said:
Think of the other definition of the cross product, how to get its direction applying right-had rule, so sin(θ-φ)=bxa.
https://www.mathsisfun.com/algebra/vectors-cross-product.html
oh I think I get it now so what your saying is although I could find axb and get the answer I got first , I could just as easily choose bxa as they're both the same but have opposite signs and so it still satisfies the proof.
 
Jamiemma1995 said:
oh I think I get it now so what your saying is although I could find axb and get the answer I got first , I could just as easily choose bxa as they're both the same but have opposite signs and so it still satisfies the proof.
The correct one is bxa.
 
Isn't (i + j) X (i + j) = j X i + i X j)
What is the sign of j X i ?