Two identical speakers are situated in the x-y plane. Speaker1 has coordinates (0, 0) and speaker2...

Two identical speakers are situated in the x-y plane. Speaker1 has coordinates (0, 0) and speaker2...

Two identical speakers are situated in the x-y plane. Speaker1 has coordinates (0, 0) and speaker2 has coordinates (7/2, 0). The speakers are driven by the same source of frequency 113 Hz, and the velocity of sound is 339 m/sec. Find the location (in fractional form) of all the minima and maxima for 0 < x < 7/2

Two identical speakers are situated in the x-y plane. Speaker1 has coordinates (0, 0) and speaker2...

Two identical speakers are situated in the x-y plane. Speaker1 has coordinates (0, 0) and speaker2 has coordinates (7/2, 0). The speakers are driven by the same source of frequency 113 Hz, and the velocity of sound is 339 m/sec. Find the location (in fractional form) of all the minima and maxima for 0 < x < 7/2

Two identical loudspeakers are situated at the same height above a horizontal xy-plane and emit sound...

Two identical loudspeakers are situated at the same height above a horizontal xy-plane and emit sound waves of frequency 1660 Hz. The speakers are located at coordinates (0,1.57) and (0,-1.57), with units in meters. A point O on the x-axis a distance x1 = 9.1 meters away (x1,0) is the location of an interference maximum. A second point P at (x1, y2) is the location of the first minimum of sound intensity when moving away from point O in the...

Two speakers emit identical sounds at a frequency of 793 Hz and are placed 1.4 meters...

Two speakers emit identical sounds at a frequency of 793 Hz and are placed 1.4 meters apart from each other. How far away from one of the speakers should you stand so that the sound you hear is a maximum? A minimum? How many maxima/minima are there? (You may assume that you and the two speakers make a right triangle)

Imagine two identical speakers driven by the same source that are 3.00m apart on the Y−axis,...

Imagine two identical speakers driven by the same source that are 3.00m apart on the Y−axis, one being at the origin. The listener is positioned on the X−axis, 5.00m in front of the speaker at the origin. (a) Find the second lowest and third lowest frequency for destructive interference (minimum signal) at the listener’s location. (b) Find the lowest and the second lowest frequency for constructive interference (maximum signal) at the listener’s location. Draw any relevant diagrams.

A 4 x 10 cm rectangular loop of wire is situated on the x-y plane with...

A 4 x 10 cm rectangular loop of wire is situated on the x-y plane with its corners located at coordinates (0, 0), (10,0), (10, 4) and (4,0) respectively. The loop has a current of 30 A flowing in the counter-clockwise direction. Determine the magnetic field at the centre of the loop.

The coordinates of a point moving in the plane are given as x = 4t- (5t.t),...

The coordinates of a point moving in the plane are given as x = 4t- (5t.t), y = (- 3t.t) (4t.t.t) in x, y meters and t seconds. a) t = 2 seconds, coordinates and location vector, b) average speed and acceleration during the first 2 seconds, c) Find the moment velocity and acceleration at t = 2 seconds.

Solve the given nonlinear plane autonomous system by changing to polar coordinates. x' = [y −...

Solve the given nonlinear plane autonomous system by changing to polar coordinates. x' = [y − x/sqrt(x^2+y^2)](16 − x2 − y2) y'= [-x-y/sqrt(x^2+y^2)](16 − x2 − y2) X(0) = (1, 0)

Solve the given nonlinear plane autonomous system by changing to polar coordinates. x' = −y −...

Solve the given nonlinear plane autonomous system by changing to polar coordinates. x' = −y − x(x2 + y2)2 y' = x − y(x2 + y2)2,   X(0) = (3, 0) (r(t), θ(t)) =

Consider the feasible region in the xy-plane defined by the following linear inequalities. x ≥ 0...

Consider the feasible region in the xy-plane defined by the following linear inequalities. x ≥ 0 y ≥ 0 x ≤ 10 x + y ≥ 5 x + 2y ≤ 18 Part 2 Exercises: 1. Find the coordinates of the vertices of the feasible region. Clearly show how each vertex is determined and which lines form the vertex. 2. What is the maximum and the minimum value of the function Q = 60x+78y on the feasible region?