Differential Equations by (Shepley L. Ross)Descripción completa
Differential Equations by (Shepley L. Ross)Full description
DeFull description
Descripción completa
Full description
gockenbach 2nd editionFull description
A set of lecture notes compiled to teach physics students at undergraduate level. Mathematical Methods in Physics Course....supplemented with examples and home work problems.
Descripción: Nonlinear Ordinary Differential Equations by jordan, smith
Elementary Differential EquationsFull description
Instructor: Engr. Tomas U. Ganiron Jr, 2nd Semester/1998-1999, College of Engineering, Lyceum of the Philippines, ManilaFull description
Partial Differential Equation Author: Fritz JohnFull description
solutions for boyce elementary differential equationsFull description
Solving Differential Equations in Java programming.Descripción completa
solutions for boyce elementary differential equations
Descrição: solutions for boyce elementary differential equations
Hale, Ordinary Differential Equations, 1969
Good Book to Study from
Elementary Applied Partial Differential Equations -Haberman R.
dy = xy for for x >1 andy and y >0, given that y =1 whenx when x =3. dx
dy = ey given given that y =0 whenx when x =2 =2.. dx (The (T here re is is no need need to expressy expressy in terms of x of x).
[5]
Obtain a particular solution to (1− e2y )
Find an expression for y in terms terms of x of x given given that x2
dy 2 − y = 0. dx
[5] [4]
At timet time t seconds the rate of increase in the concentration of flesh eating bugs in a controlled environment is proportional to the concentrationC concentrationC of bugs presen present. t. Initially C =100 bugs and after after 2 seconds there are fi five tim times as many. dC (i) Write down a differential equation connecting , C and t and and hence find fi nd dt an expression for C in terms of t of t. [7] (ii) How many bugs are present after after 5 seconds? [2] (iii) When hen wil will the number ber of bugs exceed 5000? 5000? [3] (iv) Find the tim time at which which the concentration concentration of bugs has has increa increase sed by 50% of the the initia niti al concentrat ntratiion. [3] Water is pouring out of a small hole in the bottom of a conical container of height 25 cm. Initially the container is full. The The rate at which ich the heigh ight x of the water remaining in the container is given by dx 50 − 3 =− x 2. dt π (i) Solve the differential equation to findx findx in terms of t of t. [5] (ii) How long does does it take take for the container to empty comple pletel tely? [2]