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# Why are electric field lines curved?

## Why are electric field lines curved?

When you come to the ends of the plates, the field starts to resemble that associated with two point charges instead of a sheet of charge. Note that as you move away from the two point charges an equal distance apart, the lines look like those at the ends of your parallel plate capacitor (curved lines).

## What does electric field lines represent?

electric field: a three-dimensional map of the electric force extended out into space from a point charge. electric field lines: a series of lines drawn from a point charge representing the magnitude and direction of force exerted by that charge. vector: a quantity with both magnitude and direction.

## Which is not a property of electric field lines?

Field lines are always normal to conducting surface and they do not form closed loops. Field lines may have break, they do not exist inside a conductor.

## Which is not a property of electric charge?

So, continuity of charge is not the property.

## Why electric field is always at right angle to the equipotential surface?

Electric field is always at right angle to equipotential surface because there is no potential gradient along any direction along any direction parallel to the surface and so no electric field parallel to the surface .

## What is the angle between electric?

Therefore, the angle between dipole moment and electric field is 180°.

180°

## What is the angle between electric lines of force and surface of conductor?

Thus, the angle between electric lines of force and equipotential surface is 90∘.

## What is the angle between the direction?

“Angle between two vectors is the shortest angle at which any of the two vectors is rotated about the other vector such that both of the vectors have the same direction.” Furthermore, this discussion focuses on finding the angle between two standard vectors, which means their origin is at (0, 0) in the x-y plane.

180 degrees

## How do you find the angle of a triangle?

How To Find The Angle of a Triangle

1. Subtract the two known angles from 180° .
2. Plug the two angles into the formula and use algebra: a + b + c = 180°

## What is the angle between I J K and Y axis?

⇒ The angle between the vector i^+j^+k^ and the X axis is arccos(13√).

## What is the angle between I j?

The angle is 90 degree.

⇒θ=300.

## How do you find the angle between a vector and y axis?

If we wish to find the angle between A and the y-axis, we can use any vector that only has a y-component. It is easiest to use the unit vector in the y-direction which is denoted by y= 1j. To calculate the angle between the two vectors, we only need to manipulate the dot product equation.

## What will be the angle between the vector 2i 3j and y axis?

The angle which the vector A = 2i +3j makes with the y-axis, where i and are unit vectors along x- and y-axes, respectively, is 2.

## What is angle between 2i 2j and y axis?

Answer: The required angle is 45°.

## What will be the angle between the vector 2 i 3 J and Y axis?

Hence, the angle is tan−1(32)

## Can the resultant of two vectors be zero?

Yes, two vectors of equal magnitude that are pointing in opposite directions will sum to zero. Two vectors of unequal magnitude can never sum to zero. If they point along the same line, since their magnitudes are different, the sum will not be zero.

## What is the projection of 3 ICAP 4 K cap on Y axis?

The vector projection of a vector 3ˆi+4ˆk on y-axis is. Solution : As the multiple of ˆj in the given vector therfore this vector lies in XZ plane and projection of this vector on y-axis is zero.

## What is the angle between A and resultant of a B and A minus B?

So, the angle between the two resultants will be 90 degrees.

## What is the angle between two vector?

An angle is a measure of revolution, expressed in either degrees or radians. An angle θ between two vectors u and v, expressed in radians, is the value of the function ArcCos[θ] where Cos[θ] is the cosine determined by u and v.

## What is the angle between a B and a cross B?

two vectors A and B. lies in the same plane where A and B lie (since they are non-parallel so they define a plane and cross product between them is not zero.) So,the angle between (A+B) and (A×B) is 90°.

## What is the angle between A into B and B into a?

Anyway from this, we know that the A×B vector and B×A vector are equal in magnitude but in opposite direction, i.e they are antiparallel, so the angle between them is 180° or π rads.

## What is the value of a cross A?

We know that, cross(vector) product of two vectors is a third vector whose magnitude is given by the product of magnitude of given vectors multiplied by sin ratio of the smaller angle between them. In your case, given two vectors are the same, i.e., A and hence, they are equal in magnitude and angle between them is 0°.

## Is a * b B * A in vectors?

A-B and A+B therefore are the two diagonals of this parallelogram. The only way that these “vectors” can be the same, which means both in magnitude and in direction, is in the limit that either A or B is a zero vector. This also means that A.B will be zero, because one of them will be a zero vector.

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