3m sin( 4 x) dx 2.25n 3.25n 3n sin( 4 x ) dx- Submit Answer Tries...
ST sin2 (1 x) dx 1.25n 1.25n5n sin2 (1x)dx- Submit Answer Tries 0/3
What is the amplitude of this function? 4 Submit Answer Incorrect. Tries 2/5 Previous Tries What is the period of this function? What is the frequency (in Hz) of this function? What is the angular frequency (in rad/s) of this function? Submit Answer Tries 0/5 Submit Answer Tries 0/5 0 Submit Answer Tries 0/5 420 4 time t [s]
This is a GRADED problem; you have TWO tries for each part. Equations may be more readable if printed first. Find the eigenvalue of the operator [ (A)1-[(d)/(dx )1 acting on the functionx)-3 cos( 5 x )+3 i sin( 5 x) Submit Answer Tries 0/2 Find the eigenvalue of the operator [^ (A)]--i [(d )/(d)] acting on the function 4 ei 9 x Submit Answer Tries 0/2
3. Evaluate using the correct form -dx 0 x-2 4. Consider the sequence 3n n+1 Does the sequence converge or diverge. If it convergés, to what does it converge?
SIDE A Part I. TRUE OR FALSE QUESTIONS. 1. S* x sin(x) dx = x = x So* sin(x) dx. A. False B. True 2. / ze*dx + ***dz - / redz A. True B. False 3. 5* 5 sin(x) dx = 5 * sin(x) dx. A. True B. False 4. ds "ninta) dir = * = sin(a) dår. A. False B. True 1 5. یة x2 dx = 0 3 B. False A. True A. False B. True *...
Particle X has a speed of 0.890 c and a momentum of 6.67x10-19 kgm/s. What is the mass of the particle? Submit Answer Tries 0/10 What is the rest energy of the particle? Submit Answer Tries 0/10 What is the kinetic energy of the particle? Submit Answer Tries 0/10 What is the total energy of the particle? Submit Answer Tries 0/10
Particle X has a speed of 0.890 c and a momentum of 6.67x10-19 kgm/s. What is the mass of...
Solve for x. x - 1 3 0 4 x - 2 X = Submit Answer Tries 0/10
W60. Compute (sin x + cos x)(4 – 2 sin 2x – sin? 2x)e" dx sin 2x where = 6 (0,7) Mihály Be Pirkulyiev Rovsen W38. Let (an)n be a sequence, given by the recurrence: man+1 + (m - 2) an an-1 = 0 where me R is a parameter and the first two terms of (an), are fixed known real numbers. Find me R, so that lim an = 0 n-00 Tad
4. Show that the value of | cos(x)dx cannot be 2. 0 sin(x))
4. Integration: TT (a) Si Jachtvoz dx (b) sin x dx (6-cos x)3 (c) , (2-2)' (3) dx (d) St(t - 5)8dt 6x7-x*+VX-4 dx x2