If t is an eigenvalue of A, then t^n is an eigenvalue of A^n. If t...

Suppose V is a vector space and T is a linear operator. Prove by induction that...

Suppose V is a vector space and T is a linear operator. Prove by induction that for all natural numbers n, if c is an eigenvalue of T then c^n is an eigenvalue of T^n.

5. Suppose A is an n × n matrix, whose entries are all real numbers, that...

5. Suppose A is an n × n matrix, whose entries are all real numbers, that has n distinct real eigenvalues. Explain why R n has a basis consisting of eigenvectors of A. Hint: use the “eigenspaces are independent” lemma stated in class. 6. Unlike the previous problem, let A be a 2 × 2 matrix, whose entries are all real numbers, with only 1 eigenvalue λ. (Note: λ must be real, but don’t worry about why this is true)....

Consider the following recursive algorithm. Algorithm Test (T[0..n − 1]) //Input: An array T[0..n − 1]...

Consider the following recursive algorithm. Algorithm Test (T[0..n − 1]) //Input: An array T[0..n − 1] of real numbers if n = 1 return T[0] else temp ← Test (T[0..n − 2]) if temp ≥ T[n − 1] return temp else return T[n − 1] a. What does this algorithm compute? b. Set up a recurrence relation for the algorithm’s basic operation count and solve it.

Exercise1.2.1: Prove that if t > 0 (t∈R), then there exists an n∈N such that 1/n^2...

Exercise1.2.1: Prove that if t > 0 (t∈R), then there exists an n∈N such that 1/n^2 < t. Exercise1.2.2: Prove that if t ≥ 0(t∈R), then there exists an n∈N such that n−1≤ t < n. Exercise1.2.8: Show that for any two real numbers x and y such that x < y, there exists an irrational number s such that x < s < y. Hint: Apply the density of Q to x/(√2) and y/(√2).

Find Tn for n=10 and plot Tn with arcsin for n=3,6,10. Let T be the nth...

Find Tn for n=10 and plot Tn with arcsin for n=3,6,10. Let T be the nth degree Maclaurin polynomial of arcsin.

The function is f(x)= (x^n - x^{-n} ) / ( x - x^{-1} ) Can we...

The function is f(x)= (x^n - x^{-n} ) / ( x - x^{-1} ) Can we use L'Hopital rule if n is a complex eigenvalue ?

Prove If F is of characteristic p and p divides n, then there are fewer than...

Prove If F is of characteristic p and p divides n, then there are fewer than n distinct nth roots of unity over F: in this case the derivative is identically 0 since n=0 in F. In fact every root of x^n-1 is multiple in this case. Please write legibly, no blurry pictures and no cursive.

Verify that u=[1,13]T is an eigenvector of the matrix [[ -8,1],[-13,6]]. Find the corresponding eigenvalue lambda.

Verify that u=[1,13]T is an eigenvector of the matrix [[ -8,1],[-13,6]]. Find the corresponding eigenvalue lambda.

Let lambda be an eigenvalue of A in X'=AX of multiplicity n. Find the general solution...

Let lambda be an eigenvalue of A in X'=AX of multiplicity n. Find the general solution of dx/dt = -5x +3y dy/dt = -3x + y Use eigenvalues, eigenvectors, and coefficients in your method.

Let (V, C) be a finite-dimensional complex inner product space. We recall that a map T...

Let (V, C) be a finite-dimensional complex inner product space. We recall that a map T : V → V is said to be normal if T∗ ◦ T = T ◦ T∗ . 1. Show that if T is normal, then |T∗(v)| = |T(v)| for all vectors v ∈ V. 2. Let T be normal. Show that if v is an eigenvector of T relative to the eigenvalue λ, then it is also an eigenvector of T∗ relative to...