An inventor proposes an engine that operates between the 27 deg C warm surface layer of the ocean and a 10 deg C layer a few meters down. The claim is that this engine can produce 100 kW at a flow of 20 kg/s. Is this possible?

Answer and Explanation:

Velocity : Velocity gives us information about how much we can travel in a particular interval of time.

Velocity is a rate of change of distance if we have information about velocity and time we can easily calculate how much distance we travel in that particular time.

And if we have information about distance and time then we can find how much velocity we should have to travel that distance in given time  

Acceleration : Acceleration gives us information about how the velocity is changes with respect to time

If the velocity is increases with time then there is positive acceleration and if velocity is decreases with time then it is negative acceleration.

Answer:

V1=5ft3

V2=2ft3

n=1.377

Explanation:

PART A:

the volume of each state is obtained by multiplying the mass by the specific volume in each state

V=volume

v=especific volume

m=mass

V=mv

state 1

V1=m.v1

V1=4lb*1.25ft3/lb=5ft3

state 2

V2=m.v2

V2=4lb*0.5ft3/lb=   2ft3

PART B:

since the PV ^ n is constant we can equal the equations of state 1 and state 2

P1V1^n=P2V2^n

P1/P2=(V2/V1)^n

ln(P1/P2)=n . ln (V2/V1)

n=ln(P1/P2)/ ln (V2/V1)

n=ln(15/53)/ ln (2/5)

n=1.377

Answer:

b)False

Explanation:

A battery is a device which store the energy in the form of chemical energy.And this stored energy is used according to the requirement.So battery is not a electromechanical device.Because it does have any mechanical component like gear ,shaft flywheel etc.

A flywheel is known as mechanical battery because it stored mechanical energy and supply that energy when more energy is required.Generally fly wheel is used during punching operation.

Answer:

This is self locking.

Explanation:

Given that

Diameter d= 40 mm

Pitch (P)= 6 mm

Torque T= 1 KN.m

Friction(μ) = 0.1

Thread is double square.

Condition for self locking

[tex]\mu >tan\theta[/tex]

[tex]tan\theta=\dfrac{L} {\pi d}[/tex]

L= n x P

N= number of start

Here given that double start so n=2

L=2 x 6 = 12 mm

[tex]tan\theta=\dfrac{L} {\pi d}[/tex]

[tex]tan\theta=\dfrac{12} {\pi \times 40}[/tex]

[tex]tan\theta=0.095[/tex]            (μ = 0.1)

[tex]\mu >tan\theta[/tex]

So from we can that this is self locking.

Answer:

a) 93.852 kN

b) 128.043 mm

Explanation:

Stress is load over section:

σ = P / A

If plastic deformation begins with a stress of 297 MPa, the maximum load before plastic deformation will be:

P = σ * A

316 mm^2 = 3.16*10^-4

P = 297*10^6 * 3.16*10^-4 = 93852 N = 93.852 kN

The stiffness of the specimen is:

k = E * A / l

k = 113*10^9 * 3.16*10^-4 / 0.128 = 279 MN/m

Hooke's law:

x' = x0 * (1 + P/k)

x' = 0.128 * (1 + 93.852*10^3 / 279*10^6) = 0.128043 m = 128.043 mm

Answer:

(a) Natural frequency = 0.99 rad/sec (b) 0.4086 rad/sec

Explanation:

We have given length of pendulum = 10 m

(a) Acceleration due to gravity [tex]=9.81m/sec^2[/tex]

Time period of pendulum is given by [tex]T=2\pi\sqrt{\frac{L}{g}}[/tex], L is length of pendulum and g is acceleration due to gravity

So [tex]T=2\pi\sqrt{\frac{L}{g}}=2\times 3.14\times \sqrt{\frac{10}{9.81}}=6.34sec[/tex]

Natural frequency is given by [tex]\omega =\frac{2\pi }{T}=\frac{2\times 3.14}{6.34}=0.99rad/sec[/tex]

(b) In this case acceleration due to gravity [tex]g=1.67m/sec^2[/tex]

So time period [tex]T=2\pi\sqrt{\frac{L}{g}}=2\times 3.14\times \sqrt{\frac{10}{1.67}}=15.3674sec\[/tex]

Natural frequency [tex]\omega =\frac{2\pi }{T}=\frac{2\times 3.14}{15.36}=0.4086rad/sec[/tex]

Answer:

Pound mass is the unit of mass and which is used in United states customary to describe the mass Slug is also a unit of mass .Pound mass is lbm. But on the other hand pound force is the unit of force.Pound force is lbf.

In SI unit ,the unit of mass is kilogram(kg) and the unit of force is Newton(N)

In CGS system the unit of mass is gram and unit of force is dyne.

Answer:

true

Explanation:

True, there are several types of polymers, thermoplastics, thermosets and elastomers.

Thermosets are characterized by having a reticulated structure, so they have low elasticity and cannot be stretched when heated.

Because of the above, thermosetting polymers burn when heated.

Answer:

179000 lb

Explanation:

The supports must be able to hold the weight of the tank and the contents. Since tanks are pressure tested with water, and the supports cannot fail during testing, we disregard the air and will consider the weight of water.

The specific weight of water is ρw = 62.4 lbf/ft^3

These tanks are thin walled because

D / t = 4.6 / 0.1 = 46 > 10

To calculate the volume of steel we can approximate it by multiplying the total surface area by the thickness:

A = 2 * π/4 * D^2 + π * D * h

The steel volume is:

V = A * t

The specific weight is

ρ = δ * g

ρs = 499 lbm/ft^3 * 1 lbf/lbm = 499 lbf/ft^3

The weight of the steel tank is:

Ws = ρs * V

Ws = ρs * A * t

Ws = ρs * (2 * π/4 * D^2 + π * D * h) * t

Ws = 499 * (π/2 * 4.6^2 + π * 4.6 * 50) * 0.1 = 37700 lb

The weight of water can be approximated with the volume of the tank:

Vw = π/4 * D^2 * h

Ww = ρw * π/4 * D^2 * h

Ww = 62.4 * π/4 * 4.6^2 * 50 = 51800 lb

Wt = Ws + Ww = 37700 + 51800 = 89500 lb

Assuming the support holds both tanks

2 * 89500 = 179000 lb

The support must be able to carry 179000 lb

Answer:

x=2.19in

Explanation:

This is the equation that relates the force and displacement of a spring

F=Kx

m=mass=12.5lbx1slug/32.14lb=0.39slug

F=mg=0.39*32.2=12.52Lbf

then we calculate the spring count in lbf / ft

K=F/x

K=5.7lbf/1in=5.7lbf/in=68.4lbf/ft

Finally we calculate the displacement with the initial equation

X=F/k

x=12.52/68.4=0.18ft=2.19in

In this exercise we want to calculate how much the spring was elogate, for this we have to be:

the spring stayed x=2.19in elogante

organizing the information given in the statement we have that:

Recalling the basic equation of the spring we find that:

[tex]F=Kx[/tex]

Where:

So calculating the force we have:

[tex]F=mg\\=0.39*32.2\\=12.52[/tex]

Putting the value of the force in the given formula:

[tex]K=F/x\\K=5.7/1\\=5.7\\X=F/k=12.52/68.4\\=0.18ft\\=2.19in[/tex]

See more about spring at brainly.com/question/4433395

Answer:

1160 K.

Explanation:

Given that

Initial

Pressure P =600 KPa

Temperature T =290 K

Volume V =0.01 [tex]m^3[/tex]

If we assume that air is s ideal gas the

P V = mRT

R=0.287 KJ/kg.k

now by putting the values in above equation

600 x 0.01 = m x 0.287 x 290

m=0.07 kg

The work out at constant pressure given as

[tex]w=P(V_2-V_1)[/tex]

[tex]18=600(V_2-0.01)[/tex]

[tex]V_2=0.04\ m^3[/tex]

At constant pressure

[tex]\dfrac{T_2}{T_1}=\dfrac{V_2}{V_1}[/tex]

[tex]\dfrac{T_2}{290}=\dfrac{0.04}{0.01}[/tex]

[tex]T_2=1160\ K[/tex]

So the final temperature is 1160 K.

Answer:

The period is 0.628s

Explanation:

As the system mass-spring is in simple harmonic motion, the period is given by the equation:

[tex]T=2\pi \sqrt{\frac{m}{k}}[/tex]

where m is the mass of 2kg and k is the spring constant [tex]200\frac{N}{m}[/tex]

Replacing the values in the equation, we have:

[tex]T=2\pi \sqrt{\frac{2Kg}{200\frac{N}{m}}}[/tex]

And finally we find the value of the period, that is:

[tex]T=0.628s[/tex]

Answer:

y = 20.41 in

T= 168.1 lb

Explanation:

From diagram

Total force balance in vertical direction

T= 89.1 + 79 lb

 T= 168.1 lb

Now taking moment about point m

Mm= 0 Because system is in equilibrium position

 79 x 43.45 = T x y

Now by putting the value of T

79 x 43.45 = 168.1 x y

y = 20.41 in

So the cable attached at distance of 20.41 in from the mid point of bar.

Tension in the cable = 168.1 lb

Answer:

The dynamic viscosity and kinematic viscosity are [tex]1.3374\times 10^{-6}[/tex] lb-s/in2 and [tex]1.4012\times 10^{-3}[/tex] in2/s.

Explanation:

Step1

Given:

Inner diameter is 2.00 in.

Gap between cups is 0.2 in.

Length of the cylinder is 2.5 in.

Rotation of cylinder is 10 rev/min.

Torque is 0.00011 in-lbf.

Density of the fluid is 850 kg/m3 or 0.00095444 slog/in³.

Step2

Calculation:

Tangential force is calculated as follows:

T= Fr

[tex]0.00011 = F\times(\frac{2}{2})[/tex]

F = 0.00011 lb.

Step3

Tangential velocity is calculated as follows:

[tex]V=\omega r[/tex]

[tex]V=(\frac{2\pi N}{60})r[/tex]

[tex]V=(\frac{2\pi \times10}{60})\times1[/tex]

V=1.0472 in/s.

Step4

Apply Newton’s law of viscosity for dynamic viscosity as follows:

[tex]F=\mu A\frac{V}{y}[/tex]

[tex]F=\mu (\pi dl)\frac{V}{y}[/tex]

[tex]0.00011=\mu (\pi\times2\times2.5)\frac{1.0472}{0.2}[/tex]

[tex]\mu =1.3374\times 10^{-6}[/tex]lb-s/in².

Step5  

Kinematic viscosity is calculated as follows:

[tex]\upsilon=\frac{\mu}{\rho}[/tex]

[tex]\upsilon=\frac{1.3374\times 10^{-6}}{0.00095444}[/tex]

[tex]\upsilon=1.4012\times 10^{-3}[/tex] in2/s.

Thus, the dynamic viscosity and kinematic viscosity are [tex]1.3374\times 10^{-6}[/tex] lb-s/in2 and [tex]1.4012\times 10^{-3}[/tex] in2/s.

Answer:

The equations for magnitude and phase of current and voltages on resistor and inductor are:

[tex]I=\frac{V_m}{\sqrt{R^2+(\omega L)^2}}\angle \theta - tan^{-1}(\omega L / R)[/tex]

[tex]V_R=I\cdot Z_R=\frac{V_m \cdot R}{\sqrt{R^2+(\omega L)^2}}\angle \theta - tan^{-1}(\omega L / R)[/tex]

[tex]V_L=I\cdot Z_L=\frac{V_m \cdot (\omega L)}{\sqrt{R^2+(\omega L)^2}}\angle \theta - tan^{-1}(\omega L / R)+90^{\circ}[/tex]

Explanation:

The first step is to find the impedances of the resistance (R) and the inductor (L).

The impedance of the resistor is:

The impedance of the inductor is:

Where [tex]\omega [/tex] is the angular frequency of the source, and the angle is [tex]90^{\circ} [/tex] because a pure imaginary number is on the imaginary axis (y-axis).

The next step is to find the current expression. It is the same for the resistor and inductor because they are in series. The total impedance equals the sum of each one.

[tex]I=\frac{V}{Z_R+Z_L}[/tex]

It is said that [tex]V=V_m\angle \theta[/tex], so, the current would be:

[tex]I=\frac{V_m\angle \theta }{R+j\omega L}[/tex]

The numerator must be converted to polar form by calculating the magnitude and the angle:

The current expression would be as follows:

[tex]I=\frac{V_m\angle \theta }{\sqrt{R^2+(\omega L)^2}\, \angle tan^{-1}(\omega L / R)}[/tex]

When dividing, the angles are subtracted from each other.

The final current expression is:

[tex]I=\frac{V_m}{\sqrt{R^2+(\omega L)^2}}\angle \theta - tan^{-1}(\omega L / R)[/tex]

The last step is calculating the voltage on the resistor [tex]V_R[/tex] and the voltage on the inductor [tex]V_L[/tex]. In this step the polar form of the impedances could be used. Remember that [tex]V=I\cdot Z[/tex].

(Also remember that when multiplying, the angles are added from each other)

Voltage on the resistor [tex]V_R[/tex]

[tex]V_R=I\cdot Z_R=\bigg( \frac{V_m}{\sqrt{R^2+(\omega L)^2}}\angle \theta - tan^{-1}(\omega L / R)\bigg) \cdot (R\angle 0^{\circ})[/tex]

The final resistor voltage expression is:

[tex]V_R=I\cdot Z_R=\frac{V_m \cdot R}{\sqrt{R^2+(\omega L)^2}}\angle \theta - tan^{-1}(\omega L / R)[/tex]

Voltage on the inductor [tex]V_L[/tex]

[tex]V_L=I\cdot Z_L=\bigg( \frac{V_m}{\sqrt{R^2+(\omega L)^2}}\angle \theta - tan^{-1}(\omega L / R)\bigg) \cdot (\omega L \angle 90^{\circ})[/tex]

The final inductor voltage expression is:

[tex]V_L=I\cdot Z_L=\frac{V_m \cdot (\omega L)}{\sqrt{R^2+(\omega L)^2}}\angle \theta - tan^{-1}(\omega L / R)+90^{\circ}[/tex]

Summary: the final equations for magnitude and phase of current and voltages on resistor and inductor are:

[tex]I=\frac{V_m}{\sqrt{R^2+(\omega L)^2}}\angle \theta - tan^{-1}(\omega L / R)[/tex]

[tex]V_R=I\cdot Z_R=\frac{V_m \cdot R}{\sqrt{R^2+(\omega L)^2}}\angle \theta - tan^{-1}(\omega L / R)[/tex]

[tex]V_L=I\cdot Z_L=\frac{V_m \cdot (\omega L)}{\sqrt{R^2+(\omega L)^2}}\angle \theta - tan^{-1}(\omega L / R)+90^{\circ}[/tex]

Answer:

The correct answer is option 'b':0.25

Explanation:

By definition of strain we have

[tex]\epsilon =\frac{L_f-L_o}{L_o}[/tex]

where

[tex]\epsilon [/tex] is the strain

[tex]L_o[/tex] is the original length of specimen

[tex]L_f[/tex] is the elongated length of specimen

Applying the given values we get

[tex]\epsilon =\frac{12.5''-10''}{10''}=0.25[/tex]

Answer:

While calculating the stresses in a body since we we assume a constant distribution of stress across a cross section if the body is loaded along the centroid of the cross section , this assumption of uniformity is assumed only on the basis of Saint Venant's Principle.

Saint venant principle states that the non uniformity in the stress at the point of application of load is only significant at small distances below the load and depths greater than the width of the loaded material this non uniformity is negligible and hence a uniform stress distribution is a reasonable and correct assumption while solving the body for stresses thus greatly simplifying the analysis.

Answer:

Cutting velocity.

Explanation:

Velocity of cutting affects more as compare to the depth of cut to life of tool.

As we know that tool life equation

[tex]VT^n=C[/tex]

Where T is the tool life and  V is the tool cutting speed and C is the constant.

So from we can say that when cutting velocity  increase then tool life will decrease and vice versa.

The life of tool is more important during cutting action .The life of tool is less and then will reduce the production and leads to face difficulty .

Answer:

[tex]v_2 = 160.23 m/s[/tex]

[tex]T_2 = 475.797 k[/tex]

Explanation:

given data:

Diameter =[tex] d_1 = 200mm[/tex]

[tex]t_1 =195 degree[/tex]

[tex]p_1 =500 kPa[/tex]

[tex]v_1 = 100m/s[/tex]

[tex]p_2 = 85kPa[/tex]

[tex]d_2 = 158mm[/tex]

from continuity equation

[tex]A_1v_1 = A_2v_2[/tex]

[tex]v_2 = \frac{\frac{\pi}{4}d_1^2 v_1^2}{\frac{\pi}{4}d_2^2}[/tex]

[tex]v_2 = \frac{d_2v_1}{d_2^2}[/tex]

[tex]v_2 = [\frac{d_1}{d_2}]^2 v_1[/tex]

      [tex]= [\frac{0.200}{0.158}]^2 \times 100[/tex]

[tex]v_2 = 160.23 m/s[/tex]

by energy flow equation

[tex]h_1 + \frac{v_1^2}{2} +gz_1 +q =h_2 + \frac{v_2^2}{2} +gz_2 +w[/tex]

[tex]z_1 =z_2[/tex] and q =0, w =0 for nozzle

therefore we have

[tex]h_1 -h_2 =\frac{v_1^2}{2} -\frac{v_2^2}{2} [/tex]

[tex]dh = \frac{1}{2} (v_1^2 -v_2^2)[/tex]

but we know dh = Cp dt

hence our equation become

[tex]Cp(T_2 -T_1) = \frac{1}{2} (v_1^2 -v_2^2)[/tex]

[tex]Cp (T_2 -T_1) = 7836.94[/tex]

[tex](T_2 -T_1) = \frac{7836.94}{1.005*10^3}[/tex]

[tex](T_2 -T_1) = 7.797 [/tex]

[tex]T_2 = 7.797 +468 = 475.797 k[/tex]

Answer:

Explanation:

In aeronautics stall is the separation of the boundary layer from the wings of plane. This causes loss of lift because the otherwise low pressure area above the wing become filled with turbulent whirls.

Stall occurs when the critical angle of attack of the wing is exceeded.

Answer:

Power in kW is 104 kW

Power in horsepower is 139.41 hp

Solution:

As per the question:

Velocity of the airplane, [tex]v_{a} = 80 m/s[/tex]

Force exerted by the propeller, [tex]F_{p} = 1300 N[/tex]

Now,

The useful power that the propeller delivered, [tex]P_{p}[/tex]:

[tex]P_{p} = \frac{Energy}{time, t}[/tex]

Here, work done provides the useful energy

Also, Work done is the product of the displacement, 'x' of an object when acted upon by some external force.

Thus

[tex]P_{p} = \frac{F_{p}\times x}{time, t}[/tex]

[tex]P_{p} = \frac{F_{p}\times x}{time, t}[/tex]

[tex]P_{p} = F_{p}\times v_{a}[/tex]

Now, putting given values in it:

[tex]P_{p} = 1300\times 80 = 104000 W = 104 kW[/tex]

In horsepower:

1 hp = 746 W

Thus

[tex]P_{p} = \frac{104000}{746} = 139.41 hp[/tex]

Answer:

efficiency = 0.678

Explanation:

First we have to change temperatures from °C to K (always in thermodynamics absolute temperature is used).

[tex]\text{hot body temperature,}T_H = 1200 \circC + 273.15 = 1473.15 K[/tex]

[tex] \text{cold body temperature,} T_C = 200 \circC + 273.15 = 473.15 K[/tex]

Efficiency [tex] \eta [/tex] of a carnot engine can be calculated only with hot body and cold body temperature by

[tex] \eta = 1 - \frac{T_C}{T_H}[/tex]

[tex] \eta = 1 - \frac{473.15 K}{1473.15 K}[/tex]

[tex] \eta = 0.678[/tex]

Answer:

total amount of water after 2 min will be 84.4 kg/s

Explanation:

Given data:

one tank inflow = 0.1 kg/s

2nd tank inflow = 0.3 kg/s

3rd tank outflow = 0.03 kg/s

Total net inflow in tank is = 0.3 +0.1 =0.4 kg/s

From third point, outflow is 0.03 kg/s

Therefore, resultant in- flow = 0.4 - 0.03

Resultant inflow is  = 0.37 kg/s

Tank has initially 40 kg water

In 2 min ( 2*60 sec), total inflow in tank is 0.37*60*2 = 44.4 kg

So, total amount of water after 2 min will be = 40+44.4 = 84.4 kg

Answer:

It is attempting to change the value of a constant.

Explanation:

In this pseudocode program "GRAVITY" is declared as a constant value, therefore it cannot be changed during runtime. If you tried mo write this code in a real language and compile it you would get a compilation error because of that forbidden operation.

Answer:

a)6.8 KPa

b)0.264 gallon

c)47.84 Pa.s

Explanation:

We know that

1 lbf=  4.48 N

1 ft =0.30 m

a)

Given that

P= 1 psi

psi is called pound force per square inch.

We know that 1 psi = 6.8 KPa.

b)

Given that

Volume = 1 liter

We know that 1000 liter = 1 cubic meter.

1 liter =0.264 gallon.

c)

[tex]1\ \frac{lb.s}{ft^2}=47.84\ \frac{Pa.s}{ft^2}[/tex]

Answer:

Increases

Explanation:

Ductility:

    Ductility is the property of material to go permanent deformation due to tensile load.In other words the ability of material to deform in wire by the help of tensile load.

When temperature is increase then ductility will also increases.And when temperature decreases then the ductility will also decreases.As we know that at very low temperature material become brittle and this is know as ductile brittle transition.

Answer with Explanation:

By definition of acceleration  we have

[tex]a=\frac{dv}{dt}[/tex]

Given [tex]a=kv^{2}[/tex], using this value in the above equation we get

[tex]kv^2=\frac{dv}{dt}\\\\\frac{dv}{v^{1}}=kdt[/tex]

Upon integrating on both sides we get

[tex]\int \frac{dv}{v^2}=\int kdt\\\\-\frac{1}{v}=kt+c[/tex]

'c' is the constant of integration whose value can be found out by putting value of 't' = 0 and noting V =4 m/s

Thus [tex]c=-\frac{1}{4}[/tex]

the value of 'k' can be found by using the fact that at t= 30 seconds velocity = 26 m/s

[tex]\frac{-1}{26}=k\times 30-\frac{1}{4}\\\\\therefore k=\frac{\frac{-1}{26}+\frac{1}{4}}{30}\\\\k=7.05\times 10^{-3}[/tex]

Hence the velocity as a function of time is given by

[tex]v(t)=\frac{-1}{7.05\times 10^{-3}t-\frac{1}{4}}[/tex]

By definition of velocity  we have

[tex]v=\frac{dx}{dt}[/tex]

Making use of the obtained velocity function we get

[tex]\frac{dx}{dt}=\frac{-1}{kt-\frac{1}{4}}\\\\\int dx=\int \frac{-dt}{kt-\frac{1}{4}}\\\\x(t)=\frac{-1}{7.05\times 10^{-3}}\cdot ln(7.05\times 10^{-3}t-\frac{1}{4})+x_o[/tex]

here [tex]x_o[/tex] is the constant of integration

Answer:

The temperature attains equilibrium with the surroundings.  

Explanation:

When the light bulb is lighted we know that it's temperature will go on increasing as the filament of the bulb has to  constantly dissipates energy during the time in which it is on. Now this energy is dissipated as heat as we know it, this heat energy is absorbed by the material of the bulb which is usually made up of glass, increasing it's temperature. Now we know that any object with temperature above absolute zero has to dissipate energy in form of radiations.

Thus we conclude that the bulb absorbs as well as dissipates it's absorbed thermal energy. we know that this rate is dependent on the temperature of the bulb thus it the temperature of the bulb does not change we can infer that an equilibrium has been reached in the above 2 processes i.e the rate of energy absorption equals the rate of energy dissipation.

Steady state is the condition when the condition does not change with time no matter whatever the surrounding conditions are.

Answer:

[tex]\sigma = 65.25\ ksi[/tex]

Explanation:

given data:

D = 8 inch

R =4 inch

thickness = 0.018 inch

width = 0.625 inch

[tex]E =29*10^6 psi[/tex]

from bending equation we know that

[tex]\frac{\sigma}{y} = \frac{M}{I} = \frac{E}{R}[/tex]

[tex]\sigma = \frac{Ey}{R}[/tex]

Where y represent distance from neutral axis

[tex]y = \frac{t}[2}[/tex]

[tex]y = \frac{0.018}{2}[/tex]

y = 0.009inch

[tex]\sigma = \frac{29*10^6*0.009}{4}[/tex]

[tex]\sigma = 65250\ psi[/tex]

[tex]\sigma = 65.25\ ksi[/tex]

Answer with Explanation:

Assuming that the degree of consolidation is less than 60% the relation between time factor and the degree of consolidation is

[tex]T_v=\frac{\pi }{4}(\frac{U}{100})^2[/tex]

Solving for 'U' we get

[tex]\frac{\pi }{4}(\frac{U}{100})^2=0.2\\\\(\frac{U}{100})^2=\frac{4\times 0.2}{\pi }\\\\\therefore U=100\times \sqrt{\frac{4\times 0.2}{\pi }}=50.46%[/tex]

Since our assumption is correct thus we conclude that degree of consolidation is 50.46%

The consolidation at different level's is obtained from the attached graph corresponding to Tv = 0.2

i)[tex]\frac{z}{H}=0.25=U=0.71[/tex] = 71% consolidation

ii)[tex]\frac{z}{H}=0.5=U=0.45[/tex] = 45% consolidation

iii)[tex]\frac{z}{H}=0.75U=0.3[/tex] = 30% consolidation

Part b)

The degree of consolidation is given by

[tex]\frac{\Delta H}{H_f}=U\\\\\frac{\Delta H}{1.0}=0.5046\\\\\therefore \Delta H=50.46cm[/tex]

Thus a settlement of 50.46 centimeters has occurred

For time factor 0.7, U is given by

[tex]T_v=1.781-0.933log(100-U)\\\\0.7=1.781-0.933log(100-U)\\\\log(100-U)=\frac{1.780-.7}{0.933}=1.1586\\\\\therefore U=100-10^{1.1586}=85.59[/tex]

thus consolidation of 85.59 % has occured if time factor is 0.7

The degree of consolidation is given by

[tex]\frac{\Delta H}{H_f}=U\\\\\frac{\Delta H}{1.0}=0.8559\\\\\therefore \Delta H=85.59cm[/tex]