Determine if the following subsets are subspaces: 1. The set of differentiable functions such that f´...

(1 point) Which of the following subsets of {R}^{3x3} are subspaces of {R}^{3x3}? A. The 3x3...

(1 point) Which of the following subsets of {R}^{3x3} are subspaces of {R}^{3x3}? A. The 3x3 matrices with determinant 0 B. The 3x3 matrices with all zeros in the first row C. The symmetric 3x3 matrices D. The 3x3 matrices whose entries are all integers E. The invertible 3x3 matrices F. The diagonal 3x3 matrices

suppose and are functions that are differentiable at x=0 and that f(1)=2, f'(1)=-1, g(1)=-2, and g'(1)=3....

suppose and are functions that are differentiable at x=0 and that f(1)=2, f'(1)=-1, g(1)=-2, and g'(1)=3. Find the value of h'(1). 1) h(x)=f(x) g(x) 2) h(x)=xf(x) / x+g(x)

Suppose that the set S has n elements and discuss the number of subsets of various...

Suppose that the set S has n elements and discuss the number of subsets of various sizes. (a) How many subsets of size 0 does S have? (b) How many subsets of size 1 does S have? (c) How many subsets of size 2 does S have? (d) How many subsets of size n does S have? (e) Clearly the total number of subsets of S must equal the sum of the number of subsets of size 0, of size...

Determine whether the set of all continuous functions on [0,1] satisfying f(0) = 1 constitutes a...

Determine whether the set of all continuous functions on [0,1] satisfying f(0) = 1 constitutes a real linear space under the usual operations associated with elements of the set.

Suppose that f and g are infinitely differentiable functions defined on R. Suppose that Pf is...

Suppose that f and g are infinitely differentiable functions defined on R. Suppose that Pf is the second order Taylor polynomial for f centered at 0 and that Pg is the second order Taylor polynomial for g centered at 0. Let Pfg be the second order Taylor polynomial for fg centered at 0. Is Pfg = PfPg? If not, is there a relationship between Pfg and PfPg ?

Use Theorem on Subspaces to determine whether the set of all vectors of the form (b,...

Use Theorem on Subspaces to determine whether the set of all vectors of the form (b, 1, a) form a subspace of R3.

determine the Laplace transform of the following functions: a) f(t) = { 1 if 0 <...

determine the Laplace transform of the following functions: a) f(t) = { 1 if 0 < t < 5, 0 if 5 < t < 10, e^ 4t if t > 10 b) g(t) = 6e −3t − t 2 + 2t − 8

(1 point) Assume that ? and ? are differentiable functions of ?. Suppose 4?^2=?^3−?^7. Find ??/??...

(1 point) Assume that ? and ? are differentiable functions of ?. Suppose 4?^2=?^3−?^7. Find ??/?? when ?=1/9, ??/??=6, and ?>0. ??/??=

3. For each of the piecewise-defined functions f, (i) determine whether f is 1-1; (ii) determine...

3. For each of the piecewise-defined functions f, (i) determine whether f is 1-1; (ii) determine whether f is onto. Prove your answers. (a) f : R → R by f(x) = x^2 if x ≥ 0, 2x if x < 0. (b) f : Z → Z by f(n) = n + 1 if n is even, 2n if n is odd.

1). Show that if AB = I (where I is the identity matrix) then A is...

1). Show that if AB = I (where I is the identity matrix) then A is non-singular and B is non-singular (both A and B are nxn matrices) 2). Given that det(A) = 3 and det(B) = 2, Evaluate (numerical answer) each of the following or state that it’s not possible to determine the value. a) det(A^2) b) det(A’) (transpose determinant) c) det(A+B) d) det(A^-1) (inverse determinant)