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2 years ago

Triangle XYZ has vertices X(–1, –1), Y(–2, 1), and Z(1, 2). What is the approximate measure of angle Z?

Mathematics

2 answers:

Molodets [167]2 years ago

8 0

The answer to this question is A. 37.2°

sergeinik [125]2 years ago

6 0

Answer:

Step-by-step explanation:

Notice that angle Z is formed by sides XZ and YZ.

First, we need to find the slopes of each side.

$m_{XZ}=\frac{2-(-1)}{1-(-1)}= \frac{2+1}{1+1}=\frac{3}{2}$

The slope of side XZ is 3/2.

$m_{YZ}=\frac{2-1}{1-(-2)}=\frac{1}{1+2}=\frac{1}{3}$

The slope of side YX is 1/3.

Now, we need to recur to the angle-slope formula, which is gonna give us the angle between both sides, that is, angle Z.

$tan(\angle Z)=|\frac{m_{XZ}-m_{YZ}}{1+(m_{XZ})(m_{YZ})} |$

Replacing each slope, we have

$tan(\angle Z)=|\frac{\frac{3}{2}-\frac{1}{3} }{1+\frac{3}{2}(\frac{1}{3})} |\\tan(\angle Z)=|\frac{\frac{9-2}{6} }{1+\frac{1}{2} } |=|\frac{\frac{7}{6} }{\frac{3}{2} } |\\tan(\angle Z)=|\frac{14}{18} |=|\frac{7}{9} |$

Then, we solve for $\angle Z$

$\angle Z=tan^{-1}(\frac{7}{9} ) \approx 37.9\°$

Therefore, the approximate measure of angle Z is 37.9°

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2 years ago

Find a matrix P such that PTAP orthogonally diagonalizes A. Verify that PTAP gives the proper diagonal form. (Enter each matrix

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Answer:

the P matrix you are looking for is P=(1/ $\sqrt{2}$ ) · [[1 1 0 0],[1 -1 0 0],[0 0 1 1],[0 0 1 -1]]

Step-by-step explanation:

Answer:

For an orthogonal diagonalization of any matrix you have to:

1º) Find the matrix eigenvalues in a set order.

2º) Find the eigenvectors of each respective eigenvalues.

Tip: You can write the matrix A like A = $P^{t}$ D P

3º) D is the diagonal matrix with each eigenvalue (in order) in the diagonal.

4º) Write P as the normalized eigenvectors in order (in columns).

Tip 2: Remember, $P^{t}$ ·P = I, so if A = $P^{t}$ D P, then:

P A $P^{t}$ = P $P^{t}$ D P $P^{t}$ = I D I = D

So the P we are looking for is the $P^{t}$ of the diagonalization.

Tip 3: In this case, A is a block matrix with null nondiagonal submatrixes, therefore its eigenvalues can be calculated by using the diagonal submatrixes. The problem is reduced to calculate the eigenvalues of A₁₁ = A ₂₂ = [[5 3],[3 5]]

Solving:

1º)the eigenvalues of A₁₁ are {8,2}, therefore the D matrix is $\left[\begin{array}{cccc}8&0&0&0\\0&2&0&0\\0&0&8&0\\0&0&0&2\end{array}\right]$

2º) the eigenvectors of A₁₁ are P₈= {[1 1]T} P₂= {[1 -1]T}, therefore normalizing the eigenvectors you obtain P = (1/ $\sqrt{2}$ ) · [[1 1 0 0],[1 -1 0 0],[0 0 1 1],[0 0 1 -1]] (you can see that P = $P^{t}$ in this case).

As said in "tip 2": P A $P^{t}$ = P $P^{t}$ D P $P^{t}$ = I D I = D

So the P obtained is the one you are looking for.

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