PLASMA PHYSICS LECTURE 7 | Wave function, phase velocity, group velocity, plasma frequency. |
PLASMA PHYSICS LECTURE 7 | Wave function, phase velocity, group velocity, plasma frequency. |
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- "Average Speed and Velocity: #PhysicsBasics #Speed #Velocity #Motion #Kinematics #Distance #Displacement #Time #VectorQuantities #PhysicsTutorial""Average Speed and Velocity: #PhysicsBasics #Speed #Velocity #Motion #Kinematics #Distance #Displacement #Time #VectorQuantities #PhysicsTutorial"1 Commentaires 1 Parts 950 Vue 70 0 Aperçu1
- In Advanced Level Maths, the equations of linear motion are:
1. Constant Acceleration:
- v = u + at
- s = ut + (1/2)at^2
- v^2 = u^2 + 2as
Where:
v = final velocity
u = initial velocity
a = acceleration
t = time
s = displacement
1. Uniform Motion:
- s = vt
- v = s/t
Where:
s = distance
v = constant velocity
t = time
1. Motion with Variable Acceleration:
- dv/dt = a(t)
- v = ∫a(t)dt
- s = ∫v(t)dt
Where:
a(t) is the acceleration function
v(t) is the velocity function
s(t) is the position function
These equations describe linear motion in one dimension. In two or three dimensions, vector equations are used to describe motion.In Advanced Level Maths, the equations of linear motion are: 1. Constant Acceleration: - v = u + at - s = ut + (1/2)at^2 - v^2 = u^2 + 2as Where: v = final velocity u = initial velocity a = acceleration t = time s = displacement 1. Uniform Motion: - s = vt - v = s/t Where: s = distance v = constant velocity t = time 1. Motion with Variable Acceleration: - dv/dt = a(t) - v = ∫a(t)dt - s = ∫v(t)dt Where: a(t) is the acceleration function v(t) is the velocity function s(t) is the position function These equations describe linear motion in one dimension. In two or three dimensions, vector equations are used to describe motion.
0 Commentaires 0 Parts 477 Vue 0 Aperçu - In Advanced Level Maths, the equations of linear motion are:
1. Constant Acceleration:
- v = u + at
- s = ut + (1/2)at^2
- v^2 = u^2 + 2as
Where:
v = final velocity
u = initial velocity
a = acceleration
t = time
s = displacement
1. Uniform Motion:
- s = vt
- v = s/t
Where:
s = distance
v = constant velocity
t = time
1. Motion with Variable Acceleration:
- dv/dt = a(t)
- v = ∫a(t)dt
- s = ∫v(t)dt
Where:
a(t) is the acceleration function
v(t) is the velocity function
s(t) is the position function
These equations describe linear motion in one dimension. In two or three dimensions, vector equations are used to describe motion.In Advanced Level Maths, the equations of linear motion are: 1. Constant Acceleration: - v = u + at - s = ut + (1/2)at^2 - v^2 = u^2 + 2as Where: v = final velocity u = initial velocity a = acceleration t = time s = displacement 1. Uniform Motion: - s = vt - v = s/t Where: s = distance v = constant velocity t = time 1. Motion with Variable Acceleration: - dv/dt = a(t) - v = ∫a(t)dt - s = ∫v(t)dt Where: a(t) is the acceleration function v(t) is the velocity function s(t) is the position function These equations describe linear motion in one dimension. In two or three dimensions, vector equations are used to describe motion.
0 Commentaires 0 Parts 482 Vue 0 Aperçu - In Advanced Level Maths, the equations of linear motion are:
1. Constant Acceleration:
- v = u + at
- s = ut + (1/2)at^2
- v^2 = u^2 + 2as
Where:
v = final velocity
u = initial velocity
a = acceleration
t = time
s = displacement
1. Uniform Motion:
- s = vt
- v = s/t
Where:
s = distance
v = constant velocity
t = time
1. Motion with Variable Acceleration:
- dv/dt = a(t)
- v = ∫a(t)dt
- s = ∫v(t)dt
Where:
a(t) is the acceleration function
v(t) is the velocity function
s(t) is the position function
These equations describe linear motion in one dimension. In two or three dimensions, vector equations are used to describe motion.In Advanced Level Maths, the equations of linear motion are: 1. Constant Acceleration: - v = u + at - s = ut + (1/2)at^2 - v^2 = u^2 + 2as Where: v = final velocity u = initial velocity a = acceleration t = time s = displacement 1. Uniform Motion: - s = vt - v = s/t Where: s = distance v = constant velocity t = time 1. Motion with Variable Acceleration: - dv/dt = a(t) - v = ∫a(t)dt - s = ∫v(t)dt Where: a(t) is the acceleration function v(t) is the velocity function s(t) is the position function These equations describe linear motion in one dimension. In two or three dimensions, vector equations are used to describe motion.
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