SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical.
MTC- 243 Python Programming Language -II (mathematics) practical
Practical No. and name
Questions
Solutions
Practical 1: Graph Plotting (Unit 1 – 1.1 – 1.3)
Practical 2: Graph Plotting (Unit 1 – 1.4 – 1.7)
Practical 3: Application to Computational Geometry (Unit 2 – 2.1)
Practical 4: Application to Computational Geometry (Unit 2 – 2.2)
Practical 5: Application to Computational Geometry (Unit 2 – 2.3)
Practical 6: Study of Graphical aspects of Two dimensional transformation matrix using matplotlib
Practical 7: Study of Graphical aspects of Three dimensional transformation matrix using matplotlib
Practical 8: Study of Graphical aspects of Three dimensional transformation matrix using matplotlib
Practical 9: Study of effect of concatenation of Two dimensional and Three dimensional transformations
Practical 10: Generation of Bezier curve using given control points
Practical 11: Study of Operational Research in Python (Unit 3.1)
Practical 12: Study of Operational Research in Python (Unit 3.2)
S.Y.BSc(Comp.Sci.) Python practical 01
Title: 2D Graphs
1) Write a Python program to plot 2D graph of the functions f(x) = x^2 and g(x)= x^3 in [−1, 1].
2) Write a Python program to plot 2D graph of the functions f(x) = log10(x) in
the interval [0, 5].
3) Using Python plot the graph of function f(x) = sin(x) on the interval [0, 2π].
4) Using Python plot the graph of function f(x) = sin^(-1)(x) on the interval [−1,1].
5) Using Python, plot the graph of function f(x) = sin(x) − e^x + 3x − log10(x) on the Interval [0, π].
6) Plot the graph of f(x) = x^5 in [0, 5] with red dashed line with circle markers.
7) Plot the graphs of sin x, cos x, e^x and x^2 in [0, 5] in one figure with (2 × 2) subplots.
8) Write a python program to Plot 2D X-axis and Y-axis black color and in the
same diagram plot green triangle with vertices [5, 4], [7, 4], [6, 6].
9) Plot the graph of y = e ^((−x)^2) in [−5, 5] with red dashed-points line with Upward
Pointing triangle.
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 01. solution.
SYBSc (comp. sci.) Python Practical -1
PYTHON Practical no-2 SYBSC (Comp. Sci)
For Solution Click Here
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 02. solution.
To download answers click here
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 03. solution.
Python Practical No. 4 SYBSC ( Comp. Sci.)
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 11. solution.
Practical no4 Solution
4fvv
Python Practical no. 5 Sybsc (comp.sci)
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 05. solution.
SYBSC python practical no.05
Python practical No. 06
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 06. solution.
python practical no. 6
Python practical no. 07
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics)
practical No. 07. solution.
Python practical no. 07
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics)
practical No. 07. solution.
SYBSC Python practical no. 08
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 08. solution.
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 09. solution.
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 10. solution.
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 10. solution.
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 11. solution.
These practical based on linear programming problems. Here we solve linear programming problems using python. It is very easy and interesting find the solution of LPP by python programming. In this practical we solve the 6 questions of LPP by using python programming. Which is very useful for mathematics students to solve LPP.
Python programming save the time and get good results.
Some questions for practice.
.
1) Minimize: Z = 6x + 7y
4x + y ≥ 40,
2x + 3y ≥ 90,
x, y ≥ 0
2) Maximize Z = 2x + 3y
x + y ≤ 30,
x ≤ 20, y ≤ 12
x, y ≥ 0
Practical No. 12
Practical No. 12 Solution
S.Y.BSc(Comp.Sci.) Python practical 01
Title: 2D Graphs
1) Write a Python program to plot 2D graph of the functions f(x) = x^2 and g(x)= x^3 in [−1, 1].
2) Write a Python program to plot 2D graph of the functions f(x) = log10(x) in
the interval [0, 5].
3) Using Python plot the graph of function f(x) = sin(x) on the interval [0, 2π].
4) Using Python plot the graph of function f(x) = sin^(-1)(x) on the interval [−1,1].
5) Using Python, plot the graph of function f(x) = sin(x) − e^x + 3x − log10(x) on the Interval [0, π].
6) Plot the graph of f(x) = x^5 in [0, 5] with red dashed line with circle markers.
7) Plot the graphs of sin x, cos x, e^x and x^2 in [0, 5] in one figure with (2 × 2) subplots.
8) Write a python program to Plot 2D X-axis and Y-axis black color and in the
same diagram plot green triangle with vertices [5, 4], [7, 4], [6, 6].
9) Plot the graph of y = e ^((−x)^2) in [−5, 5] with red dashed-points line with Upward
Pointing triangle.
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 01. solution.
SYBSc (comp. sci.) Python Practical -1
PYTHON Practical no-2 SYBSC (Comp. Sci)
For Solution Click Here
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 02. solution.
To download answers click here
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 03. solution.
Python Practical No. 4 SYBSC ( Comp. Sci.)
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 11. solution.
Practical no4 Solution
4fvv
Python Practical no. 5 Sybsc (comp.sci)
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 05. solution.
SYBSC python practical no.05
Python practical No. 06
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 06. solution.
python practical no. 6
Python practical no. 07
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics)
practical No. 07. solution.
Python practical no. 07
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics)
practical No. 07. solution.
SYBSC Python practical no. 08
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 08. solution.
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 09. solution.
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 10. solution.
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 10. solution.
SYBSc(C S) Sem - IV MTC- 243 Python Programming Language -II (mathematics) practical No. 11. solution.
These practical based on linear programming problems. Here we solve linear programming problems using python. It is very easy and interesting find the solution of LPP by python programming. In this practical we solve the 6 questions of LPP by using python programming. Which is very useful for mathematics students to solve LPP.
Python programming save the time and get good results.
Some questions for practice.
.
1) Minimize: Z = 6x + 7y
4x + y ≥ 40,
2x + 3y ≥ 90,
x, y ≥ 0
2) Maximize Z = 2x + 3y
x + y ≤ 30,
x ≤ 20, y ≤ 12
x, y ≥ 0
Practical No. 12
Practical No. 12 Solution
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