Answer:
Explanation:
Given that,
Omega is a function of the following
ω = f(b, h, v, ρ, k)
Where, all unit have a dimension of
ω = T^-1
b = L
h = L
V = LT^-1
ρ = FL^-4T²
k = FL
Then,
From the pie theorem
The required pi term is 6—3 = 3 terms,
So, we use V, p and b as a repeating term.
For first pi
π1 = ω•b^a•v^b•ρ^c.
Since
ω= T^-1, b = L, v = LT^-1 and
ρ= FL^-4T²
Since π is dimensionless then,
π = F^0•L^0•T^0
(T^-1)•(L^a)•(LT^-1)^b•(FL^-4T²)^c = F^0•L^0•T^0
Rearranging
F^0•L^0•T^0 = F^c•T^(2c-b-1)• L^(a+b-4c)
Comparing coefficient
c = 0
2c - b - 1 = 0
b = 2c - 1 = 0 - 1 = -1
a + b - 4c = 0
a = 4c - b = 0 - -1 = 0+1
a = 1
Then, a = 1, b = -1 and c = 0
So, π1 = ω•b^a•v^b•ρ^c.
π1 = ω•b^1•v^-1•ρ^0
π1 = ω•b / v
Check dimensions
ωb/v = (T^-1)L / LT^-1 = L^0•T^0 = 1
Then, π1 is dimensionless
For second pi
π2 = h•b^a•v^b•ρ^c.
Since
h = L, b = L, v = LT^-1 and ρ= FL^-4T²
Since π is dimensionless then,
π = F^0•L^0•T^0
(L)•(L^a)•(LT^-1)^b•(FL^-4T²)^c = F^0•L^0•T^0
Rearranging
F^0•L^0•T^0 = F^c•T^(2c-b)• L^(1+a+b-4c)
Comparing coefficient
c = 0
2c - b = 0
b = 2c = 0
1 + a + b - 4c = 0
a = 4c - b - 1 = 0 -0 - 1 = -1
a = -1
Then, a = -1, b = 0 and c = 0
So, π2 = h•b^a•v^b•ρ^c.
π2 = h•b^-1•v^0•ρ^0
π2 = h / b
Check dimensions
h / b = L / L = 1
Then, π2 is dimensionless
For third pi
π3 = k•b^a•v^b•ρ^c.
Since
k= FL, b = L, v = LT^-1 and ρ=FL^-4T²
Since π is dimensionless then,
π = F^0•L^0•T^0
(FL)•(L^a)•(LT^-1)^b•(FL^-4T²)^c = F^0•L^0•T^0
Rearranging
F^0•L^0•T^0 = F^(c+1)•T^(2c-b)• L^(1+a+b-4c)
Comparing coefficient
c + 1= 0
Then, c = -1
2c - b = 0
b = 2c = -2
1 + a + b - 4c = 0
a = 4c - b - 1 = -4 +2 - 1 = -3
a = -3
Then, a = -3, b = -2 and c = -1
So, π3 = k•b^a•v^b•ρ^c.
π3 = k•b^-3•v^-2•ρ^-1
Therefore,
π3 = k / b³•v²•ρ
Let check for dimension
π3 = FL / (L³• L²T^-2 • FL^-4T²)
π3 = FL / (L^(3+2-4) • T^(-2+2) •F)
π3 = FL / (L• T^(0) •F)
π3 = FL / LF = 1
π3 is also dimensions less
So.
I. There are three none dimensional pi
II. The none dimensional group are
π1 = ω•b / v
π2 = h / b
π3 = k / b³•v²•ρ
III. Reynolds Number. The Reynolds number is the ratio of inertial forces to viscous forces and it is dimensionless
So, the π3 can be considered as a Reynolds number
Answer:
F₁ = 1500 N
F₂ = 750 N
= 500 N
Explanation:
Given :
Power transmission, P = 7.5 kW
= 7.5 x 1000 W
= 7500 W
Belt velocity, V = 10 m/s
F₁ = 2 F₂
Now we know from power transmission equation
P = ( F₁ - F₂ ) x V
7500 = ( F₁ - F₂ ) x 10
750 = F₁ - F₂
750 = 2 F₂ - F₂ ( ∵F₁ = 2 F₂ )
∴F₂ = 750 N
Now F₁ = 2 F₂
F₁ = 2 x F₂
F₁ = 2 x 750
F₁ = 1500 N , this is the maximum force.
Therefore we know,
= 3 x
where is centrifugal force
=
/ 3
= 1500 / 3
= 500 N
Answer:
Explanation:
From the question we are told that:
Water flow Rate
Initial Temperature
Final Temperature
Let
Specific heat of water
And
Generally the equation for Heat transfer rate of water is mathematically given by
Heat transfer rate to water= mass flow rate* specific heat* change in temperature
Therefore
Answer:
Explanation:
Our values are,
State 1
We know moreover for the tables A-15 that
State 2
For tables we know at T=320K
We need to use the ideal gas equation to estimate the mass, so
Using now for the final mass:
We only need to apply a energy balance equation:
The negative value indidicates heat ransfer from the system