@zareen
Stem Cell Treatments
Each year, scientists and medical biotechnical researchers advance further into the field of stem cell research. … In the future, scientists can use this medical biotechnology to help regrow human cells, potentially replacing limbs and organs or even healing cancer patients.
MTH643 Assignment 1 Solution and Discussion

Instructions:
Assignment NO.01 Spring 2020
Total Marks: 20 Due Date: 15062020
Write the code of the given problems in Script File with .m extension
You can directly upload the .m file or you can paste the code and output in word file and then upload the word file.
Question # 1
In parametric form the circle of radius 1 centered at (0, 0) can be expressed in parametric form
as x = cos(2 π t) and y = sin(2 π t) where t is from 0 to 1.
Graph the circle with given parametric equations in MATLAB with 1. plot function
2. ezplot function
Question # 2
22222
Draw the contour plot of lemniscate x − y = (x +y ) . You can take any range for the
meshgrid.
Question # 3
Find the sixth derivative of the following given function using MATLAB
f (x) = sin(4x2 3) + 
@MalikQasim said in MTH643 Assignment 1 Solution and Discussion:
plz written sol today is extend day
@MalikQasim said in MTH643 Assignment 1 Solution and Discussion:
plz written sol today is extend day
We are trying best please wait. its paid assignment but we are trying to provide FREE ASAP!

plz written sol today is extend day

@MalikQasim said in MTH643 Assignment 1 Solution and Discussion:
plz share the sol of MTH643
We provides only idea solution. We can hire a teacher for you if you want complete solution.

plz snd the written sol

@zaasmi said in MTH643 Assignment 1 Solution and Discussion:
In parametric form the circle of radius 1 centered at (0, 0) can be expressed in parametric form
as x = cos(2 π t) and y = sin(2 π t) where t is from 0 to 1. 
plz share the sol of MTH643

Please share idea

Question # 1
In parametric form the circle of radius 1 centered at (0, 0) can be expressed in parametric form
as x = cos(2 π t) and y = sin(2 π t) where t is from 0 to 1.
Graph the circle with given parametric equations in MATLAB with 1. plot function2. ezplot functionAnswer 1:
t= 0:0.01:1;
x = cos(2pit);
y = sin(2pit);
plot(x,y)
And for figure 2:
ezplot(‘x^2+y^2=1’)Answer 1:
Using plot
Using ezplot:
Question # 2
22222
Draw the contour plot of lemniscate x − y = (x +y ) . You can take any range for the
meshgrid.Answer 2:
x = linspace(2pi,2pi);
y = linspace(0,4*pi);
[X,Y] = meshgrid(x,y);
Z = XY(X+Y);
contour(X,Y,Z)
Question # 3
Find the sixth derivative of the following given function using MATLAB
f (x) = sin(4x2 3) +
Answer 3:syms x
f = sin(4x^2/3);
diff(f,6)
We get:
ans =
(163840x^4cos((4x^2)/3))/81  (2560cos((4x^2)/3))/9 + (20480x^2sin((4x^2)/3))/9  (262144x^6sin((4x^2)/3))/729https://www.coursehero.com/qa/attachment/12556913/https://www.coursehero.com/qa/attachment/12557005/https://www.coursehero.com/qa/attachment/12557153/