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ASSIGNMENT
DRIVE
|
SPRING 2015
|
PROGRAM
|
BCA(REVISED FALL 2012)
|
Semester
|
3
|
SUBJECT CODE & NAME
|
BCA3010 - COMPUTER ORIENTED
NUMERICAL METHODS
|
CREDIT
|
4
|
BK ID
|
B 1643
|
MAX.MARKS
|
60
|
Note:
Answer all questions. Kindly note that answers for 10 marks questions should be
approximately of 400 words. Each question is followed by evaluation scheme.
Q.1
Find the Taylors Series for (π₯) = π₯3 − 10π₯2 + 6 about π₯0 = 3
Solution: Consider the one dimensional
initial value problem
y' = f(x, y), y(x0) = y0
where
f is a function of two variables x and y
and (x0 , y0) is a known point on the solution curve.
Q. 2. Find a real root of the
transcendental equation cos x – 3x+1 = 0, correct to four decimal places using
iteration method.
Solution:
Iteration Method: Let the given
equation be f(x) = 0 and the value of x to be determined. By using the
Iteration method you can find the roots of the equation. To find the root of
the equation first we have to write equation like below
x =
pi(x)
Let
x=x0 be an initial approximation of the required root Ξ± then the first
approximation x1 is given by x1 = pi(x0).
Q.3
Solve the equations
2x
+ 3y + z = 9
x +
2y + 3z = 6
3x
+ y + 2z = 8 by LU decomposition method.
Solution:
We shall solve the system
2x + 3y + z = 9
x + 2y + 3z = 6
3x + y
+ 2z = 8
Q.4
Fit a second degree parabola y = a + bx + cx2 in the least square method for
the following data and hence estimate y at x = 6.
X
|
1
|
2
|
3
|
4
|
5
|
Y
|
10
|
12
|
13
|
16
|
19
|
Solution:
The given straight line fit be y = ax+b. The normal equations of least squre
fit are
aSxi2 + bSxi = Sxiyi ---------------- (1)
and aSxi + nb = Syi
--------------------- (2)
Q.5 The population of a certain town is shown in the
following table
Year X
|
1931
|
1941
|
1951
|
1961
|
1971
|
Population Y
|
40.62
|
60.80
|
79.95
|
103.56
|
132.65
|
Find the rate of growth of the population in 1961.
Solution:
Year
X
|
1931
|
1941
|
1951
|
1961
|
1971
|
Population
Y
|
40.62
|
60.80
|
79.95
|
103.56
|
132.65
|
Here h
= 10
Q. 6. Solve of π¦π+2 − 2 πΆππ πΌ π¦π+1 + π¦π = πΆππ πΌπ.
Solution: The order of the
difference equation is the difference between the largest and smallest
arguments occur-ring in the difference equation divided by the unit of
argument.Thus, the order of the difference equation=Largest argument Smallest
argument Unit of argument.
We
have yn = A2n + B(-2)n => yn-A2n – B(-2)n
Dear
students get fully solved assignments
Send
your semester & Specialization name to our mail id :
“
help.mbaassignments@gmail.com ”
or
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