Line 21: Line 21:
 
I am also having difficulty with P356 #29 & 30.  I have found the Eigen values and Eigen vectors, placed the Eigenvectors into matrix, and solved teh diagonal matrix.  I don't know where to go from here???  Any help??
 
I am also having difficulty with P356 #29 & 30.  I have found the Eigen values and Eigen vectors, placed the Eigenvectors into matrix, and solved teh diagonal matrix.  I don't know where to go from here???  Any help??
  
 +
 +
4.3, Problem 3:  Can you explain the answer in the back of the book.  It appears from the answer that there are Eigenvalues of 2, but I don't see how there can be Eigenvalues of 2 from this set of ODE.
 
[[2010 MA 527 Bell|Back to the MA 527 start page]]  
 
[[2010 MA 527 Bell|Back to the MA 527 start page]]  
  

Revision as of 14:28, 18 September 2010

Homework 4 work area

Collaborate on HWK 4 here.

Section 8.4 #29 Does anybody have any thoughts about the solution to the second part of number 29 and the proof for #30? For the positive definite case and negative definite case, finding the determinate seems sufficient. I'm not sure how to show the indefinite case.

(rekblad 9/18) for #29 part 2 showing Q is indefinite, isn't it enough to just find two vectors that show Q > 0 and Q < 0 and also show that Q!=0 for x!=0 ? (Actually, on second thought, I think Q indefinite => Q may = 0 for some x!=0)

Problem 18 on page 146 Do I have the time rate of change equations correct:

Y1' = 48/100Y1 + 16/400Y2 - 64/100Y1 Y2' = 64/100Y1 - 64/100Y2

I am not sure on the 48/100Y1 portion of equation 1.

Need help with P356 #29 and 30. This is my understanding of #29-> Positive definiteness of Prob23: [x1 x2]^T * [4 Sqrt(3), Sqrt(3) 2] * [x1 x2] >0 for all X(vector) not equal to 0(vector). So, 4 > 0, and the det([4 Sqrt(3), Sqrt(3) 2]) >0. Therefore, it is positive definite. And for Prob19: [x1 x2]^T * [1 12, 12 -6] * [x1 x2], 1 > 0 and det ([1 12, 12 -6]) < 0. Therefore, it it indefinite.

I am also having difficulty with P356 #29 & 30. I have found the Eigen values and Eigen vectors, placed the Eigenvectors into matrix, and solved teh diagonal matrix. I don't know where to go from here??? Any help??


4.3, Problem 3: Can you explain the answer in the back of the book. It appears from the answer that there are Eigenvalues of 2, but I don't see how there can be Eigenvalues of 2 from this set of ODE. Back to the MA 527 start page

To Rhea Course List

Alumni Liaison

To all math majors: "Mathematics is a wonderfully rich subject."

Dr. Paul Garrett