Math Principles

Thursday, March 7, 2013

Mixing - Non Reacting Fluids

Category: Chemical Engineering Math, Differential Equations

"Published in Newark, California, USA"

Consider a tank that initially contains 100 gallons of a solution in which 50 pounds of salt are dissolved. Suppose that 3 gallons of brine, each gallon containing 2 pounds of salt, run into the tank each minute, and that the mixture, kept uniform by stirring, runs out at the rate of 2 gallons per minute. Find the amount of salt in the tank at time t.

Solution:

The first thing that we have to do is to analyze and illustrate the given word problem as follows

Photo by Math Principles in Everyday Life

Since the given word problem involves the mixture of non-reactive fluids, the working equation will be as follows

where

r₁ = volumetric flow rate at the entrance
c₁ = concentration of substance at the entrance
r₂ = volumetric flow rate at the exit
c₂ = concentration of substance at the exit

Since c₂ is usually not given in the problem, we can rewrite the above equation as follows

where

x = the amount of salt at time t
V = final volume of a solution at time t

but

where

V₀ is the initial volume of solution at t = 0

Therefore, the final working equation will be

In the given word problem, we know that

r₁ = 3 gals/min
c₁ = 2 lbs/gal
r₂ = 2 gals/min
V₀ = 100 gals
x₀ = 50 lbs

then the above equation becomes

Since the above equation is a first order, first degree linear equation, the integrating factor will be equal to

The general solution of the above equation is

If x = 50 lbs of salt at t = 0, then the value of C is

Therefore, the particular solution of the above equation or the amount of salt in the tank at time t is

Wednesday, March 6, 2013

Proving - Inscribed Triangle, Circle

Category: Plane Geometry

"Published in Newark, California, USA"

Given: ∆ABC inscribed in circle O

Prove: m∠BAC = ½ m(arc BC)

Photo by Math Principles in Everyday Life

Solution:

Consider the given figure and we will label further as follows

Photo by Math Principles in Everyday Life

Proof:

1. Statement: From point A, draw a line that passes through the center of a circle.

Reason: Line AO will be used later to get m∠BOC.

2. Statement: Draw radius OB and let m∠BAO = x.

Reason: Radius OB will be used to create an isosceles ∆BOA and x as the base angle.

3. Statement: OB ≅ OA and m∠BAO ≅ m∠OBA.

Reason: OB and OA are the radius of a circle and the two sides of an isosceles triangles are congruent. The two base angles of an isosceles triangles are congruent.

4. Statement: m∠BOA = 180° - 2x

Reason: The sum of the three angles of a triangle is always equal to 180°.

5. Statement: m∠BOD = 180° - (180° - 2x) = 2x

Reason: The sum of supplementary angles is always 180°. m∠BOA and m∠BOD are supplementary angles.

6. Statement: Draw radius OC and let m∠CAO = y.

Reason: Radius OC will be used to create an isosceles ∆COA and y as the base angle.

7. Statement: OC ≅ OA and m∠CAO ≅ m∠OCA.

Reason: OC and OA are the radius of a circle and the two sides of an isosceles triangles are congruent. The two base angles of an isosceles triangles are congruent.

8. Statement: m∠COA = 180° - 2y

Reason: The sum of the three angles of a triangle is always equal to 180°.

9. Statement: m∠COD = 180° - (180° - 2y) = 2y

Reason: The sum of supplementary angles is always 180°. m∠COA and m∠COD are supplementary angles.

10. Statement: m∠BAC = x + y and m∠BOC = 2x + 2y.

Reason: Addition property of angles

11. Statement: m∠BAC = ½ m∠BOC

Reason: If OA, OB, and OC are equidistant from its center at O, then m∠BAC = ½ m∠BOC.

12. Statement: m∠BOC = m(arc BC)

Reasons: If m∠BOC is a central angle formed by the two radii OB and OC, then m(arc BC) is an arc formed by a central angle.

13. Statement: m∠BAC = ½ m∠BOC = ½ m(arc BC)

Reasons: Substitution proposition.

Tuesday, March 5, 2013

Triangle Inscribed - Circle Problem

Category: Trigonometry, Plane Geometry

"Published in Newark, California, USA"

If R is the radius of a circle circumscribed about the triangle ABC, show that