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3 years ago

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(a) Define a slip system. (b) Cite one slip system for the simple cubic crystal structure. (c) One slip system for the BCC cryst

al structure is (110)[111]. Sketch itin a unit cell. (d) Explain why FCC and BCC metals are ductile, while HCP metals are less ductile.

1 answer:

Lemur [1.5K]3 years ago

4 0

Answer:

I'm gonna say D.

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More discussion about seriesConnect(Ohm) function In your main(), first, construct the first circuit object, called ckt1, using

STALIN [3.7K]

Answer:

resistor.h

//circuit class template

#ifndef TEST_H

#define TEST_H

#include<iostream>

#include<string>

#include<vector>

#include<cstdlib>

#include<ctime>

#include<cmath>

using namespace std;

//Node for a resistor

struct node {

string name;

double resistance;

double voltage_across;

double power_across;

};

//Create a class Ohms

class Ohms {

//Attributes of class

private:

vector<node> resistors;

double voltage;

double current;

//Member functions

public:

//Default constructor

Ohms();

//Parameterized constructor

Ohms(double);

//Mutator for volatage

void setVoltage(double);

//Set a resistance

bool setOneResistance(string, double);

//Accessor for voltage

double getVoltage();

//Accessor for current

double getCurrent();

//Accessor for a resistor

vector<node> getNode();

//Sum of resistance

double sumResist();

//Calculate current

bool calcCurrent();

//Calculate voltage across

bool calcVoltageAcross();

//Calculate power across

bool calcPowerAcross();

//Calculate total power

double calcTotalPower();

//Display total

void displayTotal();

//Series connect check

bool seriesConnect(Ohms);

//Series connect check

bool seriesConnect(vector<Ohms>&);

//Overload operator

bool operator<(Ohms);

};

#endif // !TEST_H

resistor.cpp

//Implementation of resistor.h

#include "resistor.h"

//Default constructor,set voltage 0

Ohms::Ohms() {

voltage = 0;

}

//Parameterized constructor, set voltage as passed voltage

Ohms::Ohms(double volt) {

voltage = volt;

}

//Mutator for volatage,set voltage as passed voltage

void Ohms::setVoltage(double volt) {

voltage = volt;

}

//Set a resistance

bool Ohms::setOneResistance(string name, double resistance) {

if (resistance <= 0){

return false;

}

node n;

n.name = name;

n.resistance = resistance;

resistors.push_back(n);

return true;

}

//Accessor for voltage

double Ohms::getVoltage() {

return voltage;

}

//Accessor for current

double Ohms::getCurrent() {

return current;

}

//Accessor for a resistor

vector<node> Ohms::getNode() {

return resistors;

}

//Sum of resistance

double Ohms::sumResist() {

double total = 0;

for (int i = 0; i < resistors.size(); i++) {

total += resistors[i].resistance;

}

return total;

}

//Calculate current

bool Ohms::calcCurrent() {

if (voltage <= 0 || resistors.size() == 0) {

return false;

}

current = voltage / sumResist();

return true;

}

//Calculate voltage across

bool Ohms::calcVoltageAcross() {

if (voltage <= 0 || resistors.size() == 0) {

return false;

}

double voltAcross = 0;

for (int i = 0; i < resistors.size(); i++) {

voltAcross += resistors[i].voltage_across;

}

return true;

}

//Calculate power across

bool Ohms::calcPowerAcross() {

if (voltage <= 0 || resistors.size() == 0) {

return false;

}

double powerAcross = 0;

for (int i = 0; i < resistors.size(); i++) {

powerAcross += resistors[i].power_across;

}

return true;

}

//Calculate total power

double Ohms::calcTotalPower() {

calcCurrent();

return voltage * current;

}

//Display total

void Ohms::displayTotal() {

for (int i = 0; i < resistors.size(); i++) {

cout << "ResistorName: " << resistors[i].name << ", Resistance: " << resistors[i].resistance

<< ", Voltage_Across: " << resistors[i].voltage_across << ", Power_Across: " << resistors[i].power_across << endl;

}

}

//Series connect check

bool Ohms::seriesConnect(Ohms ohms) {

if (ohms.getNode().size() == 0) {

return false;

}

vector<node> temp = ohms.getNode();

for (int i = 0; i < temp.size(); i++) {

this->resistors.push_back(temp[i]);

}

return true;

}

//Series connect check

bool Ohms::seriesConnect(vector<Ohms>&ohms) {

if (ohms.size() == 0) {

return false;

}

for (int i = 0; i < ohms.size(); i++) {

this->seriesConnect(ohms[i]);

}

return true;

}

//Overload operator

bool Ohms::operator<(Ohms ohms) {

if (ohms.getNode().size() == 0) {

return false;

}

if (this->sumResist() < ohms.sumResist()) {

return true;

}

return false;

}

main.cpp

#include "resistor.h"

int main()

{

//Set circuit voltage

Ohms ckt1(100);

//Loop to set resistors in circuit

int i = 0;

string name;

double resistance;

while (i < 3) {

cout << "Enter resistor name: ";

cin >> name;

cout << "Enter resistance of circuit: ";

cin >> resistance;

//Set one resistance

ckt1.setOneResistance(name, resistance);

cin.ignore();

i++;

}

//calculate totalpower and power consumption

cout << "Total power consumption = " << ckt1.calcTotalPower() << endl;

return 0;

}

Output

Enter resistor name: R1

Enter resistance of circuit: 2.5

Enter resistor name: R2

Enter resistance of circuit: 1.6

Enter resistor name: R3

Enter resistance of circuit: 1.2

Total power consumption = 1886.79

Explanation:

Note

Please add all member function details.Its difficult to figure out what each function meant to be.

8 0

3 years ago

2. A thin vertical panel L = 3 m high and w = 1.5 m wide is thermally insulated on one side and exposed to a solar radiation flu

n200080 [17]

Answer: 383.22K

Explanation:

L = 3m, w = 1.5m

Area A = 3 x 1.5 = 4.5m2

Q' = 750W/m2 (heat from sun) ,

& = 0.87

Q = &Q' = 0. 87x750 = 652.5W/m2

E = QA = 652.5 x 4.5 = 2936.25W

T(sur) = 300K, T(panel) = ?

Using E = §€A(T^4(panel) - T^4(sur))

§ = Stefan constant = 5.7x10^-8

€ = emmisivity = 0.85

2936.25 = 5.7x10^-8 x 0.85 x 4.5 x (T^4(panel) - 300^4)

T(panel) = 383.22K

See image for further details.

5 0

3 years ago

Why is the face of the claw on a claw hammer usually a smooth curve? Why isn't it straight or some other shape?

GarryVolchara [31]

Answer:

The face of the claw on the claw hammer is usually a smooth curve so as to improve the ease with which nails are removed when removing nails because as the nail held between the V shaped split claw is being pulled out from the wood, it slides more and more towards cheek, reducing the distance of the nail from the cheek which is the fulcrum, thereby increasing the mechanical advantage because the location of the hand on the grip remains unchanged

Explanation:

7 0

3 years ago

Suppose that the cost of electrical energy is $0.15 per kilowatt hour and that your electrical bill for 30 days is $80. Assume t

mr_godi [17]

Answer:

a) 740 W b) 6.2 A c) 8.1%

Explanation:

We need first to get the total energy spent during the 30 days, that can be calculated as follows:

1 month = 30 days = 720 hr

If the total cost amounts $80 (for 720 hr), and the cost per kwh is 0.15, we have:

80 $/mo = 0.15 $/Kwh*x Kwh/mo

Solving for the total energy spent in the month:

$x (kwh/mo) = \frac{80}{0.15} = 533.3 kwh$

Assuming that the power delivered is constant over the entire 30 days, as power is the rate of change of energy, we can find the power as follows:

$P = \frac{E}{t} = \frac{533.3 kWh}{720 h} = 0.74 kW = 740 W$

b) If the power is supplied by a voltage of 120 V, we can find the current I as follows:

$I =\frac{P}{V} =\frac{740W}{120V} = 6.2A$

c) If part of the electrical load is a 60-W light, we can substract this power from the one we have just found, as follows:

P = 740 W - 60 W = 680 W

The new value of the energy spent during the entire month will be as follows:

E = 0.68 kW*24(hr/day)*30(days/mo) = 490 kWh/mo

The reduction in percentage regarding the total energy spent can be calculated as follows:

ΔE = $\frac{533.3-490}{533.3} = 0.081*100= 8.1%$

⇒ ΔE(%) = 8.1%

$%(E) =\frac{533.3-490}{533.3} = 0.081 * 100 = 8.1%$

4 0

4 years ago

1 kg of saturated steam at 1000 kPa is in a piston-cylinder and the massless cylinder is held in place by pins. The pins are rem

BARSIC [14]

Answer:

The final specific internal energy of the system is 1509.91 kJ/kg

Explanation:

The parameters given are;

Mass of steam = 1 kg

Initial pressure of saturated steam p₁ = 1000 kPa

Initial volume of steam, = V₁

Final volume of steam = 5 × V₁

Where condition of steam = saturated at 1000 kPa

Initial temperature, T₁ = 179.866 °C = 453.016 K

External pressure = Atmospheric = 60 kPa

Thermodynamic process = Adiabatic expansion

The specific heat ratio for steam = 1.33

Therefore, we have;

$\dfrac{p_1}{p_2} = \left (\dfrac{V_2}{V_1} \right )^k = \left [\dfrac{T_1}{T_2} \right ]^{\dfrac{k}{k-1}}$

Adding the effect of the atmospheric pressure, we have;

p = 1000 + 60 = 1060

We therefore have;

$\dfrac{1060}{p_2} = \left (\dfrac{5\cdot V_1}{V_1} \right )^{1.33}$

$P_2= \dfrac{1060}{5^{1.33}} = 124.65 \ kPa$

$\left [\dfrac{V_2}{V_1} \right ]^k = \left [\dfrac{T_1}{T_2} \right ]^{\dfrac{k}{k-1}}$

$\left [\dfrac{V_2}{V_1} \right ]^{k-1} = \left \dfrac{T_1}{T_2} \right$

$5^{0.33} = \left \dfrac{T_1}{T_2} \right$

T₁/T₂ = 1.70083

T₁ = 1.70083·T₂

T₂ - T₁ = T₂ - 1.70083·T₂

Whereby the temperature of saturation T₁ = 179.866 °C = 453.016 K, we have;

T₂ = 453.016/1.70083 = 266.35 K

ΔU = 3× $c_v$ ×(T₂ - T₁)

$c_v$ = cv for steam at 453.016 K = 1.926 + (453.016 -450)/(500-450)*(1.954-1.926) = 1.93 kJ/(kg·K)

cv for steam at 266.35 K = 1.86 kJ/(kg·K)

We use cv given by (1.93 + 1.86)/2 = 1.895 kJ/(kg·K)

ΔU = 3× $c_v$ ×(T₂ - T₁) = 3*1.895 *(266.35 -453.016) = -1061.2 kJ/kg

The internal energy for steam = $U_g = h_g -pV_g$

$h_g$ = 2777.12 kJ/kg

$V_g$ = 0.194349 m³/kg

p = 1000 kPa

$U_{g1}$ = 2777.12 - 0.194349 * 1060 = 2571.11 kJ/kg

The final specific internal energy of the system is therefore, $U_{g1}$ + ΔU = 2571.11 - 1061.2 = 1509.91 kJ/kg.

3 0

3 years ago