Respuesta :
Answer:
a) R(r) = kr⁴
b) R(r) = 1.5625 r⁴
c) R = 126.56 cm³/s when r = 3 cm
Step-by-step explanation:
Rate of flow of a gas through a cylindrical pipe = R
radius of the pipe = r
a) R ∝r⁴
R(r) = kr⁴ where k is the proportionality constant.
R(r) means R is a function of r.
b) R(r) = kr⁴
R = 400 cm³/s, r = 4 cm
400 = k × 4⁴
k = 400/4⁴ = 400/256 = 1.5625 (cm.s)⁻¹
R(r) = 1.5625 r⁴
c) R(r) = 1.5625 r⁴
R = ?
r = 3 cm
R = 1.5625 × 3⁴ = 126.5625 cm³/s = 126.56 cm³/s
- If the rate of flow is proportional to the fourth power of the radius, the expression will be [tex]R =kr^4[/tex]
- A formula for the rate of flow of that gas through a pipe of radius "r" is[tex]R(r)=1.5625r^4[/tex]
- The rate of flow of the same gas through a pipe of radius 3 is 126.5625cm³/s
Let the rate of flow of gas through the pipe be R
Let the radius of the pipe be "r"
a) If the rate of flow is proportional to the fourth power of the radius, this is expressed as:
[tex]R \ \alpha \ r^4[/tex]
Introducing the proportionality constant, the expression becomes;
[tex]R =kr^4[/tex]
b) Given the following parameters
R = 400 cm³/sec
r = 4cm
Substitute into the expression in (a)
[tex]400=4^4k\\400 =256k\\k=\frac{400}{256}\\k= 1.5625[/tex]
Substitute the proportionality constant into the original equation
[tex]R(r)=1.5625r^4[/tex]
This gives a formula for the rate of flow of that gas through a pipe of radius
c) Given that the radius is 3cm, the rate of flow of the gas through the pipe will be expressed as;
[tex]R(r)=1.5625(3)^4\\R(r)=1.5625(81)\\R(r) =126.5625cm^3/s[/tex]
Hence the rate of flow of the same gas through a pipe of radius 3 is 126.5625cm³/s
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