Show that {sin kx} is an orthogonal system on [-pi,pi]

Find the family of curves orthogonal to y^3 = kx

Find the family of curves orthogonal to y^3 = kx

Find the family of curves orthogonal to y^3 = kx

Find the family of curves orthogonal to y^3 = kx

Show that x(t) = A sin(wt) sin(kx) satisfies the wave equation, where w and k are...

Show that x(t) = A sin(wt) sin(kx) satisfies the wave equation, where w and k are some constants. Find the relation between w, k, and v so that the wave equation is satisfied.

find the orthogonal trajectories of the family of curves y=e^(kx)

find the orthogonal trajectories of the family of curves y=e^(kx)

✓For Pi as defined below, show that {P1, P2, P3} is an orthogonal subset of R4....

✓For Pi as defined below, show that {P1, P2, P3} is an orthogonal subset of R4. Find a fourth vector P4 such that {P1, P2, P3, P4} forms an orthogonal basis in R4. To what extent is P4 unique? P1 = [1,1,1,1]t, P2 = [1, −2, 1, 0]t, P3 = [1,1,1, −3]t

Find and describe the orthogonal trajectories of the family of curves y = ln(kx).

Find and describe the orthogonal trajectories of the family of curves y = ln(kx).

Prove that the family of trigonometric functions { 1, cos x, sin x, ..., cos nx,...

Prove that the family of trigonometric functions { 1, cos x, sin x, ..., cos nx, sin nx, ...} form an orthogonal system on [-pi,pi] prove that the following orthogonality relations hold integral from -pi to pi of sin nx dx = 0 and integral from -pi to pi of cos nx dx = 0

Find the specific acoustic impedance for a standing wave p = P sin kx exp(jωt). >>...

Find the specific acoustic impedance for a standing wave p = P sin kx exp(jωt). >> Answer should be: jρ0c tan(kx) Please show how to get to this answer, thanks! This is a question from a textbook (Fundamentals of Acoustics, Kinsler et al). This is the only info we have for this problem (we don't have a value for u).

Show that f(x) = x sin(x) has critical point on (0,pi) by using mean value theorem.

Show that f(x) = x sin(x) has critical point on (0,pi) by using mean value theorem.

Suppose is orthogonal to vectors and . Show that is orthogonal to every in the span...

Suppose is orthogonal to vectors and . Show that is orthogonal to every in the span {u,v}. [Hint: An Arbitrary w in Span {u,v} has the form w=c1u+c2v. Show that y is orthogonal to such a vector w.] What theorem can I use for this?