Answer:
Hence it is proved that Stokes-Oseen formula is dimensionally homogenous.
Explanation:
For equation to be dimensionally homogeneous both side of the equation must have same dimensions.
For given Equation:
F= Force, μ= viscosity, D = Diameter, V = velocity, ρ= Density
Dimensions:
Constants= 1
Now According to equation:
Simplifying above equation, we will get:
Ignore "2" as it is constant with no dimensions. Now:
Hence it is proved that Stokes-Oseen formula is dimensionally homogenous.
Answer:
transmitter hope thus helped!
Explanation:
Answer:
wala naman pong pic po wala kahit walang pic magan da parin
Answer:
dy/dx = (1 − 2x + 8y) / (4 + 3x − 12y)
Explanation:
d/dx (x − 4y) = d/dx (e^(2x + 3y − 1))
1 − 4 dy/dx = e^(2x + 3y − 1) (2 + 3 dy/dx)
Since x − 4y = e^(2x + 3y − 1):
1 − 4 dy/dx = (x − 4y) (2 + 3 dy/dx)
1 − 4 dy/dx = 2 (x − 4y) + 3 (x − 4y) dy/dx
1 − 4 dy/dx = 2x − 8y + (3x − 12y) dy/dx
1 − 2x + 8y = (4 + 3x − 12y) dy/dx
dy/dx = (1 − 2x + 8y) / (4 + 3x − 12y)
Answer:
The value of R_low is 13.1 kΩ while that of R_high is 36.8 kΩ
Explanation:
The diagram is as given as
The circuit is an inverting op amp for which the gain is given as
Here R2 is given as 450 kΩ.
R1 is given as 47 kΩ.
The gain is given as
For the Lowest value of R the value of the internal resistance rz is 0 and the gain is -10+0.05 so
So the value of R_low is 13.1 kΩ
For the Highest value of R the value of the internal resistance rz is 1 kΩ and the gain is -10-0.05 so
So the value of R_high is 36.8 kΩ