Question

using the increment method or four step rule solve for :

(ax+b)^2

Answer #1

using the increment method or four step rule solve for:
Given s=sqrt of t-2, find ds/dt

using the increment method or four step rule solve for :
y=(x^3-3x^2+3x-1)^1/3

using increment method or 4 step rule solve for:
y= x-2/x-3 , when x=6

Solve the equation Ax = b by using the LU factorization given
for A.
A= [4 -6
4
= [1 0 0 [4 -6
4 [0
-12 15
-7
-3 1 0 0 -3
5 b= 12
12 -15
8]
3 -1 1] 0 0
1] -12]
Let Ly=b and Ux=y. Solve for x and y.
y=
x=

Derive explicitly the three-step and four-step
adams-moulton methods and the three-step adams-Bashforth
method.
The two methods are used to numerically solve ODEs.

Use method of Laplace transforms to solve and explaine step by
step the following differential equation:
2y''+3y'-2y=te-2t with y(0)=0 and y'(0)=2.
Can we do this using partial fractions? if so, how? Thank you so
much!

Solve the following equations using step-by-step equational
reasoning, and list each step.
a) Solve the following equation for x ∈ ℤ/43ℤ: x2 ≡
25 (mod 43)
b) Solve the following equation for x ∈ ℤ/19ℤ: x2 ≡ 5
(mod 19)
c) Solve the following equation for x ∈ ℤ/55ℤ: x2 ≡ 1
(mod 55)
d) Solve the following equation for x ∈ ℤ/41ℤ: 3 * x2
≡ 7 (mod 41)
e) Solve the following equation for x ∈ ℤ/49ℤ: x2...

Using Matlab, solve the following ODE using Euler's
method...
I have to perform solve the ODE with both step sizes and plot
both on the same graph.
y'=1/y, Initial Condition y(0)=1. step size = 0.1 and 0.01
The interval is from 0 to 1.
UPDATE: I actually figured it out myself! THANKS

2z=(ax+y)²+b
form the partial differential equation?
where a & b are arbitrary constants.
need solution step by step

Use the method for solving equations of the form
dy/dx=G(ax+by)
to solve the following differential equation.
dy/dx=2sin(4x-2y) ignore lost solutions and give implicit
solution in the form F(x,y)=c

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