What’s are the preventive strategies for workplace violence
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Propane (C3H8) burns completely with 150% of theoretical air entering at 74°F, 1 atm, 50% relative humidity. The dry air component can be modeled as 21% O2 and 79% N2 on a molar basis. The combustion products leave at 1 atm. Determine the mole fraction of water in the products, in lbmol(water)/lbmol(products).
A 78-percent efficient 12-hp pump is pumping water from a lake to a nearby pool at a rate of 1.5 ft3/s through a constant-diameter pipe. The free surface of the pool is 32 ft above that of the lake. Determine the irreversible head loss of the piping system, in ft, and the mechanical power used to overcome it. Take the density of water to be 62.4 lbm/ft3.
It is proposed to deposit a 5 μm thick nickel coating uniformly on all surfaces of a ceramic strip measuring 15 cm x 5 cm x 2 cm by employing a vapor-phase deposition (evaporation-condensation) technique. The vapor pressure-temperature relationship for liquid Ni is of the following form: ln p (atm) = -(51,590/T) – 2.01 ln T + 32.40. The normal melting point and boiling point of nickel are 1453°C and 2730°C, respectively, and the density and atomic weights of Ni are 8.91 g.cm^-3 and 58.71 atomic mass units respectively. Calculate the energy in joules needed to evaporate the required quantity of nickel.
At steady state, air at 200 kPa, 325 K, and mass flow rateof 0.5 kg/s enters an insulated duct having differing inletand exit cross-sectional areas. The inlet cross-sectional area is6 cm26cm 2. At the duct exit, the pressure of the air is 100 kPa and the velocity is 250 m/s. Neglecting potential energyeffects and modeling air as an ideal gas with constant cp=1.008 kJ/kg⋅Kc p =1.008kJ/kg⋅K, determine(a) the velocity of the air at the inlet, in m/s. (b) the temperature of the air at the exit, in K. (c) the exit cross-sectional area, in cm2 (a) the velocity of the air at the inlet, in m/s.(b) the temperature of the air at the exit, in K.(c) the exit cross-sectional area, in cm
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Answer:
b). False
Explanation:
Lumped body analysis :
Lumped body analysis states that some bodies during heat transfer process remains uniform at all times. The temperature of these bodies is a function of temperature only. Therefor the heat transfer analysis based on such idea is called lumped body analysis.
Biot number is a dimensionless number which governs the heat transfer rate for a lumped body. Biot number is defined as the ratio of the convection transfer at the surface of the body to the conduction inside the body. the temperature difference will be uniform only when the Biot number is nearly equal to zero.
The lumped body analysis assumes that there exists a uniform temperature distribution within the body. This means that the conduction heat resistance should be zero. Thus the lumped body analysis is exact when biot number is zero.
In general it is assume that for a lumped body analysis, Biot number 0.1
Therefore, the smaller the Biot number, the more exact is the lumped system analysis.
Answers
Answer:
Minimum standard diameter for the PVC pipe = 14.26 inches
Minimum standard diameter for the steel pipe = 14.70 inches
Explanation:
Head loss = 6/1000...................................................(1)
Head loss = hf/l
............................(2)
Q = 2500 gal/min
a) Minimum standard diameter for PVC
C for PVC = 130
Equating (1) and (2) and putting C = 130
b) Minimum standard diameter for steel
C for steel = 120
Equating (1) and (2) and putting C = 120
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Answer:
(c)- Elastic modulus
Explanation:
We know that in tensile test we measure the properties of the material like yield strength,ultimate tensile strength ,Poisson ratio.
In tensile test
σ = ε E
Where σ is the stress
ε is the strain.
E is the elastic modulus.
Now for shear tress
τ = Φ G
Where τ the shear stress
Φ is the shear strain.
G is the shear modulus.
So we can say that Shear modulus is analogous to Elastic modulus.
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Answer:
I want to believe the program is to be written in java and i hope your question is complete. The code is in the explanation section below
Explanation:
import java.util.Date;
public interface Downloadable {
//abstract methods
public String getUrl();
public Date getLastDownloadDate();
}
Answers
Answer:
Explanation:
To convert to radians
A31∘43′53′′, 90∘32′11′′, 57∘43′56′′
using DMS approach ; 1degree = 60minutes = 3600 seconds
1° = 60' = 3600"
And degree to radian = multiply by π/180
A) 31∘43′53′′ = 31degree + 43minutes + 53 seconds
= 31 degree + 43minutes + 53/60
= 31 degree + 43.88minutes
= 31 degree + 43.88/60 = 31.73 degree x π/180 = 0.5534radians
FOR 90∘32′11′′ = 90 degree + 32minutes + 11seconds
= 90degree + 32minutes + 11/60
= 90 degree + 32.183minutes
= 90 degree + 32.183/60 = 90.54degree x π/180
= 1.580radians
FOR 57∘43′56′′ = 57degree + 43minutes+ 56seconds
= 57degree + 43minutes + 56/60
= 57 degree + 43.93minutes
= 57degree + 43.93/60 = 57.73degree X π/180
= 1.00radians
PART B
FOR 94∘22′19′′ = 94degree + 22minutes + 19seconds
= 94degree + 22minutes + 19/60
= 94degree + 22.32minutes
= 94degree + 22.32/60
= 94.37degree X π/180 = 1.65radians
FOR 40∘54′53′′ = 40degree + 54minutes + 53seconds
= 40 degree + 54minutes + 53/60
= 40 degree + 54.88minutes = 40 degree + 54.88/60
= 40.91degree X π/180 = 0.714radians
FOR 44∘42′48′′ = 44degree + 42minutes + 48seconds
= 44degree + 42.8minutes
= 44.71degree X π/180 = 0.780radians
Answer:
A.
0.176270π rad, 0.502980π rad, 0.320735π rad
B.
0.524289π rad, 0.227304π rad, 0.248407π rad
Explanation:
We know that,
1° = 60' 180° = π
1 ' = 1°/60 1° = π/180
A.
a. 31°43'53''
Step 1
53'' = 53 * 1/60
= 53'/60
Step 2
43'53''
= 43'+53'/60
= (2580+43)/60
= 2623'/60
-------- Convert to degrees
= 2623/60 * 1/60
= 2623/3600
Step 3
31°43'53''
= 31+ 2623/3600
= (111600 + 2623)/3600
= 114223°/3600
Now, we convert to radians
= 114223/3600 * π/180°
= 0.176270π rad
b.
90°32'11''
Step 1.
11' = 11 * 1/60
= 11/60
Step 2
32'11'
= 32 + 11/60
= 1931/60
-------- Convert to degrees
= 1931/60 * 1/60
= 1931/3600
Step 3
90°31'11''
= 90 + 1931/3600
= 325931°/3600
Now we convert to radians
= 325931°/3600 * π/180°
= 0.502980π rad
c.
57°43'56''
Step 1
56' = 56 * 1/60
= 56/60
= 14/15
Step 2
43'56''
= 43 + 14/15
= 659/15
Now we convert to degrees
= 659/15 * 1/60
= 659°/900
Step 3
57°43'56''
= 57 + 659/900
= 51959/900
Now we convert to radians
= 51959°/900 * π/180°
= 0.320735π rad
B.
a.
94∘22′19′′
Step 1
19'' = 19/60
Step 2
22'19''
= 22 + 19/60
= 1339/60
Now we convert to degrees
= 1339/60 * 1/60
= 1339°/3600
Step 3
94°22'19"
= 94 + 1339/3600
= 339739°/3600
Now we convert to radians
= 339739°/3600 * π/180
= 0.524289π rad
b.
40∘54′53′′
Step 1
53" = 53/60
Step 2
54'53"
= 54'+ 53/60
= 3293/60
Now we convert to degrees
= 3293/60 * 1/60
= 3293/3600
Step 3
40°54'53"
= 40 + 3293/3600
= 147293/3600
Now we convert to radians
= 147293/3600 * π/180
= 0.227304π rad
c.
44∘42′48′
Step 1
48' = 48/69
= 4/5
Step 2
42'48"
= 42 + 4/5
=214/5
Nowz we convert to degrees
= 214/5 * 1/60
= 107/150
Step 3
44°42'48"
= 44 + 107/150
= 6707/150
Now we convert to radians
= 6707/150 * π/180
= 0.248407π rad
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Answer:
//This Program is written in C++
// Comments are used for explanatory purpose
#include <iostream>
using namespace std;
enum mailbox{open, close};
int box[149];
void closeAllBoxes();
void OpenClose();
void printAll();
int main()
{
closeAllBoxes();
OpenClose();
printAll();
return 0;
}
void closeAllBoxes()
{
for (int i = 0; i < 150; i++) //Iterate through from 0 to 149 which literarily means 1 to 150
{
box[i] = close; //Close all boxes
}
}
void OpenClose()
{
for(int i = 2; i < 150; i++) {
for(int j = i; j < 150; j += i) {
if (box[j] == close) //Open box if box is closed
box[j] = open;
else
box[j] = close; // Close box if box is opened
}
}
// At the end of this test, all boxes would be closed
}
void printAll()
{
for (int x = 0; x < 150; x++) //use this to test
{
if (box[x] = 1)
{
cout << "Mailbox #" << x+1 << " is closed" << endl;
// Print all close boxes
}
}
}
Explanation: