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Why the two solutions doesn't work, though it looks very valid for me:

>> t = -pi:0.1:pi;
>> r = ((sin(t)*sqrt(cos(t)))*(sin(t) + (7/5))^(-1)) - 2*sin(t) + 2 ;
??? Error using ==> mtimes
Inner matrix dimensions must agree.

>> t = -pi:0.1:pi;
>> r = ((sin(t).*sqrt(cos(t))).*(sin(t) + (7/5)).^(-1)) - 2*sin(t) + 2 ;
>> plot(r,t)
??? Error using ==> plot
Vectors must be the same lengths.

What's wrong with the above?

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1 Answer 1

up vote 4 down vote accepted

The * operator is the matrix multiplication operator, which requires its operands to have matching inner matrix dimensions. The .* operator is the element-wise multiplication operator, which requires its operands to have the same size (or for one to be a scalar) so it can perform multiplication on each matching pair of elements. See this link for more detail.

Also, I don't get the plotting error you do when I run the second solution. I just get this warning:

Warning: Imaginary parts of complex X and/or Y arguments ignored
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BTW, what do you mean by inner matrix dimension? –  user198729 May 4 '10 at 19:09
For an operation A*B the inner matrix dimensions are the columns of A and the rows of B, which must be equal to perform a matrix multiplication. –  gnovice May 4 '10 at 19:11
Where does the Imaginary part come from since there is no explicit mentioning of it? –  user198729 May 4 '10 at 19:12
Seems it's more a MATLAB term than math term,right? –  user198729 May 4 '10 at 19:14
@user198729: The imaginary parts come from the sqrt(cos(t)) term. When cos(t) is negative, the square root is imaginary. –  gnovice May 4 '10 at 19:35

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