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How to Calculate and Solve for Magnetic Flux Density or Field Induction | The Calculator Encyclopedia

The image above represents the magnetic flux density/field induction.

To compute the magnetic force of a field, four essential parameters are needed and the parameters are Magnetic Force (F), Quantity of Charge (q), Average Velocity of the Charge (v) and Angle between v and B (θ).

The formula for calculating the magnetic flux density/field induction:

B = ^F / _qVsinθ

Where;
B = Magnetic Induction or Magnetic Flux Density
F = Magnetic Force
q = Quantity of Charge
v = Average Velocity of the charge
θ = Angle between v and B

Let’s solve an example;
Find the magnetic flux density/field induction of a field when Magnetic Force (F) is 17, Quantity of Charge (q) is 21, Average Velocity of the Charge (v) is 15 and Angle between v and B (θ) is 120°.

This implies that;
F = Magnetic Force = 17
q = Quantity of Charge = 21
v = Average Velocity of the charge = 15
θ = Angle between v and B = 120°

B = ^F / _qVsinθ
B = ¹⁷ / _{(21 x 15)(sin 120°)}
B = ¹⁷ / _(315)(0.866)
B = ¹⁷ / _(272.79)
B = 0.0623

Therefore, the magnetic flux density/field induction is 0.0623 Tesla.

Continue reading How to Calculate and Solve for Magnetic Flux Density or Field Induction | The Calculator Encyclopedia

How to Calculate and Solve for the Current, Time and Quantity of Charge | Nickzom Calculator

The image above represents the quantity of charge.

To compute the quantity of charge, two essential parameters are needed and the parameters are current (I) and time (t).

The formula for calculating the quantity of charge;

Q = It

Where;
Q = Quantity of Charge
I = Current
t = Time

Let’s solve an example;
Find the quantity of charge when the current (I) is 24 amp with a time of 8 secs.

This implies that;
I = Current = 24 amp
t = Time = 8 secs

Q = It
Q = 24 x 8
Q = 192

Therefore, the quantity of charge is 192 coulombs (C).

Calculating the Current (I) of a charge using the Quantity of Charge (Q) and the time (t).

I = ^Q / _t

Where;
I = Current
Q = Quantity of the charge
t = Time

Let’s solve an example;
Find the current of a charge with the quantity of the charge as 150 coulombs (C) and time as 15 secs.

This implies that;
Q = Quantity of the charge = 150 C
t = Time = 15 secs

I = ^Q / _t
I = ¹⁵⁰ / ₁₅
I = 10

Therefore. the current is 10 Ampere (A).

Continue reading How to Calculate and Solve for the Current, Time and Quantity of Charge | Nickzom Calculator

How to Calculate and Solve for Magnetic Force | Nickzom Calculator

The image above represents magnetic force.

To compute the magnetic force of a field, four essential parameters are needed and the parameters are Quantity of Charge (q), Average Velocity of the Charge (v), Magnetic Field Induction or Magnetic Flux Density (B) and Angle between v and B (θ).

The formula for calculating the magnetic force:

F = qVBsinθ

Where;
F = Magnetic Force
q = Quantity of Charge
v = Average Velocity of the Charge
B = Magnetic Field Induction or Magnetic Flux Density
θ = Angle between v and B

Let’s solve an example;
Find the magnetic force of a field when the Quantity of Charge (q) is 11, Average Velocity of the Charge (v) is 20, Magnetic Field Induction or Magnetic Flux Density (B) is 17 and Angle between v and B (θ) is 28°.

This implies that;
q = Quantity of Charge = 11
v = Average Velocity of the Charge = 20
B = Magnetic Field Induction or Magnetic Flux Density = 17
θ = Angle between v and B = 28°

F = qVBsinθ
F = 11 x 20 x 17 x sin28°
F = 11 x 20 x 17 x 0.469
F = 1755.82

Therefore, the magnetic force is 1755.82 Newton (N).

Continue reading How to Calculate and Solve for Magnetic Force | Nickzom Calculator

How to Calculate and Solve for Escape Velocity | The Calculator Encyclopedia

The image above represents the escape velocity.

To compute the escape velocity of a field, two essential parameters are needed and the parameters are acceleration due to gravity (g) and radius (r).

The formula for calculating the escape velocity:

V = √(2gR)

Where;
V = Escape velocity
g = Acceleration due to gravity
R = Radius

Let’s solve an example;
Find the escape velocity of a field when the acceleration due to gravity is 12 and the radius is 24 cm.

This implies that;
g = Acceleration due to gravity = 12
r = Radius = 24 cm

V = √(2gR)
V = √(2 x 12 x 24)
V = √(576)
V = 24

Therefore, the escape velocity is 24 m/s.

Continue reading How to Calculate and Solve for Escape Velocity | The Calculator Encyclopedia

How to Calculate and Solve for Gravitational Potential | The Calculator Encyclopedia

The image above represents the Gravitational potential.

To compute the gravitational potential of a field, two essential parameters are needed which are mass (m) and radius (r).

The formula for calculating the gravitational potential;

V = ^(Gm) / _r

Where;
V = Gravitational potential
m = Mass
r = Radius

Let’s solve an example;
Find the gravitational potential of a field when the mass is 14 cm with a radius of 9 cm.

This implies that;
m = Mass = 14 cm
r = Radius = 9 cm

V = ^(Gm) / _r
V = ^{(6.67 x 10-11 x 14)} / ₉
V = ^1.0375e-10 / ₉
V = 1.0375e-10

Therefore, the gravitational potential is 1.0375e-10 Volts (V).

Continue reading How to Calculate and Solve for Gravitational Potential | The Calculator Encyclopedia

How to Calculate and Solve for Gravitational Force | The Calculator Encyclopedia

The image above represents the gravitational force.

To compute the gravitational force of a field, three parameters are needed and this parameters are mass (m₁), mass (m₂) and radius between the masses (R).

The formula for calculating the gravitational force:

F = ^Gm₁m₂ / _r²

Where;
F = Gravitational force
m₁ = Mass 1
m₂ = Mass 2
r = Radius between the masses

Let’s solve an example;
Find the gravitational force of a field when the mass 1 is 8 cm, mass 2 is 10 cm and the radius between masses is 14 cm.

This implies that;
m₁ = Mass 1 = 8 cm
m₂ = Mass 2 = 10 cm
r = Radius between the masses = 14 cm

F = ^Gm₁m₂ / _r²
F = ^{(6.67 x 10-11 x 8 x 10)} / ₁₉₆
F = ^5.336e-9 / ₁₉₆
F = 2.722e-11

Therefore, the gravitational force is 2.722e-11 Newton (N).

Continue reading How to Calculate and Solve for Gravitational Force | The Calculator Encyclopedia

How to Calculate and Solve for the Area of an Ellipsoid | The Calculator Encyclopedia

The image above is an ellipsoid.

To compute the area of an ellipsoid, three essential parameters are needed and this parameters are axis (a), axis (b) and axis (c).

The formula for calculating the area of an ellipsoid:

A = 4π(^{(ab)1.6 + (ac)1.6 + (bc)1.6}⁄₃)^{1 / 1.6}

Where;
A = Area of the ellipsoid
a = Axis of the ellipsoid
b = Axis of the ellipsoid
c = Axis of the ellipsoid

Let’s solve an example;
Find the the area of an ellipsoid when the axis (a) of the ellipsoid is 12 cm, axis (b) of the ellipsoid is 6 cm and axis (c) of the ellipsoid is 2 cm.

This implies that;
a = Axis of the ellipsoid = 12 cm
b = Axis of the ellipsoid = 6 cm
c = Axis of the ellipsoid = 2 cm

A = 4π(^{(ab)1.6 + (ac)1.6 + (bc)1.6}⁄₃)^{1 / 1.6}
A = 4π(^{((12)(6))1.6 + ((12)(2))1.6 + ((6)(2))1.6}⁄₃)^{1 / 1.6}
A = 4π(^{((72)1.6 + (24)1.6 + (12)1.6)}⁄₃)^{1 / 1.6}
A = 4π(^{((936.98) + (161.56) + (53.29))}⁄₃)^{1 / 1.6}
A = 4π(^(1151.84)⁄₃)^{1 / 1.6}
A = 4π(383.946)^{1 / 1.6}
A = 4π(383.946)^0.625
A = 4π(41.2258)
A = (12.566)(41.2258)
A = 518.059

Therefore, the area of the ellipsoid is 518.059 cm².

Continue reading How to Calculate and Solve for the Area of an Ellipsoid | The Calculator Encyclopedia

How to Calculate and Solve for the Axis and Volume of an Ellipsoid | The Calculator Encyclopedia

The image above is an ellipsoid.

To compute the volume of an ellipsoid, three essential parameters are needed and this parameters are axis (a), axis (b) and axis (c).

The formula for calculating the volume of an ellipsoid:

V = ^4πabc ⁄ ₃

Where;

V = Volume of the ellipsoid
a = Axis of the ellipsoid
b = Axis of the ellipsoid
c = Axis of the ellipsoid

Let’s solve an example;
Given that the axis of the ellipsoid (a) is 9 cm and axis of the ellipsoid (b) is 11 cm with the axis (c) of 14 cm. Find the volume of the ellipsoid?

This implies that;
a = Axis of the ellipsoid = 9 cm
b = Axis of the ellipsoid = 11 cm
c = Axis of the ellipsoid = 14 cm

V = ^4πabc ⁄ ₃
V = ^{4π(9 x 11 x 14)} ⁄ ₃
V = ^4π(1386) ⁄ ₃
V = ^{(12.56)(1386)} / ₃
V = ^{(17416.98967)} / ₃
V = 5805.66

Therefore, the volume of the ellipsoid is 5805.66 cm³.

Calculating the Axis (a) of an Ellipsoid using the Volume of the Ellipsoid, Axis (b) of the Ellipsoid and Axis (c) of the Ellipsoid.

a = ^V3 / _4πbc

Where;
a = Axis of the ellipsoid
V = Volume of the ellipsoid
b = Axis of the ellipsoid
c = Axis of the ellipsoid

Let’s solve an example;
Find the axis (a) of an ellipsoid when the volume of the ellipsoid is 280 cm³ with an axis (b) of 18 cm and axis (c) of 8 cm.

This implies that;
V = Volume of the ellipsoid = 280 cm³
b = Axis of the ellipsoid = 18 cm
c = Axis of the ellipsoid = 8 cm

a = ^V3 / _4πbc
a = ^{280 x 3} / _{(12.566)(18 x 8)}
a = ⁸⁴⁰ / _{(12.566)(144)}
a = ⁸⁴⁰ / _1809.504
a = 0.46

Therefore, the axis (a) of the ellipsoid is 0.46 cm.

Continue reading How to Calculate and Solve for the Axis and Volume of an Ellipsoid | The Calculator Encyclopedia

How to Calculate and Solve for the Radius, Height and Surface Area of a Spherical Segment | The Calculator Encyclopedia

The image above is a spherical segment.

To compute the surface area of a spherical segment requires two essential parameters which are the radius of the sphere (R) and the height (h).

The formula for calculating the surface area of the spherical segment:

A = 2πRh

Where;
A = Surface area of the spherical segment
R = Radius of the sphere
h = Height of the spherical segment

Let’s solve an example;
Find the surface area of a spherical segment when the radius of the sphere is 12 cm and the height is 16 cm.

This implies that;
R = Radius of the sphere = 12 cm
h = Height of the spherical segment = 16 cm

A = 2πRh
A = 2π (12 x 16)
A = 2π (192)
A = 6.28 (192)
A = 1206.37

Therefore, the surface area of the spherical segment is 1206.37 cm².

Calculating the Radius of the Sphere using the Surface Area of the Spherical Segment and the Height.

R = ^A / _2πh

Where;
R = Radius of the sphere
A = Surface area of the spherical segment
h = Height of the spherical segment

Let’s solve an example;
Find the radius of a sphere with a surface area of 300 cm² and a height of 12 cm.

This implies that;
A = Surface area of the spherical segment = 300 cm²
h = Height of the spherical segment = 12 cm

R = ^A / _2πh
R = ³⁰⁰ / _{2 x π x 12}
R = ³⁰⁰ / _75.41
R = 3.978

Therefore, the radius of the sphere is 3.978 cm.

Continue reading How to Calculate and Solve for the Radius, Height and Surface Area of a Spherical Segment | The Calculator Encyclopedia

How to Calculate and Solve for the Volume of a Spherical Segment | Nickzom Calculator

The image above is a spherical segment.

To compute the volume of a spherical segment requires three essential parameters which are the radius of the spherical segment base (r₁), radius of the spherical segment (r₂) and height (h).

The formula for calculating the volume of the spherical segment:

V = ^{πh(3r₁² + 3r₂² + h²)} ⁄ ₆

Where;
V = Volume of the spherical cap
r₁ = Radius of the spherical segment base
r₂ = Radius of the spherical segment base
h = Height of the spherical segment

Let’s solve an example;
Find the volume of a spherical segment when the radius of the spherical segment base (r₁) is 7 cm, radius of the spherical segment base (r₂) is 9 cm and a height of 20 cm.

This implies that;
r₁ = Radius of the spherical segment base = 7 cm
r₂ = Radius of the spherical segment base = 9 cm
h = Height of the spherical segment = 20 cm

V = ^{πh(3r₁² + 3r₂² + h²)} ⁄ ₆
V = ^{π x 20(3 x 7² + 3 x 9² + 20²)} ⁄ ₆
V = ^{π x 20(3 x 49 + 3 x 81 + 400)} ⁄ ₆
V = ^{π x 20(147 + 243 + 400)} ⁄ ₆
V = ^{π x 20(790)} ⁄ ₆
V = ^{π x 15800} ⁄ ₆
V = ^49643.6 ⁄ ₆
V = 8273.9

Therefore, the volume of the spherical segment is 8273.9 cm³.

Continue reading How to Calculate and Solve for the Volume of a Spherical Segment | Nickzom Calculator