Dear students get fully solved assignments
Send your semester & Specialization name to our
mail id :
“ help.mbaassignments@gmail.com ”
or
Call us at : 08263069601
ASSIGNMENT
|
PROGRAM
|
BCA
|
|
SEMESTER
|
1
|
|
SUBJECT CODE & NAME
|
BCA 1030- BASIC MATHEMATICS
|
|
CREDIT
|
4
|
|
BK ID
|
B0947
|
|
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
(i) Express 7920 in radians and (7π/12) c in degrees.
Answer: (i) The conversion is 180O= π
radian
So 79200 = (7920*3.14)/180 = 138.247
radians
(7π/12) c
(ii)
Prove that (tan θ + sec θ – 1)/ (tan θ + sec θ +1) = Cos θ / (1-sin θ) = (1+sin
θ)/ Cos θ)
Solution:
(tan θ + sec θ – 1)/ (tan θ + sec θ +1)
=(1+sin θ)/ Cos θ
If (tan θ + sec θ – 1)/ (tan θ + sec θ +1)
= (1/cosθ) +(sinθ/cosθ)
If
Q.2
(i) y= xm/n, m,n being integers, n>0 find dy/dx
Solution: Let y= xm/n
Let dy be the
increment in y corresponding to the increment dx in x.
(ii)
Differentiate log (2x+3) from first principle.
Solution: First principles is also known
as "delta method", since many texts use Δx (for "change in x)
and Δy (for "change in y"). This makes the algebra appear more
difficult, so here we use h for Δx instead. We still call it "delta
method".
We can approximate this value by taking a
point somewhere near to P(x, f(x)), say Q(x + h, f(x + h)).
Putting this together, we can write the
slope of the tangent at P as:
Q.3
Evaluate ò2cosx+3sinx/4cosx+5sinx
dx = I
Solution:
Q.4
Solve dy/dx = (y+x-2)/(y-x-4).
Answer: dy/dx = (y+x-2)/(y-x-4)
-------------------------------- (i)
Put y = vx
Diff w.r.t “x”
dy/dx = v.1+x.dx/dx
Q.5
(i) If a = cos q + i sin q, 0<q<2P prove
that 1+a/1-a = i cot q/2
Solution: Given a = cos q + i sin q, 0<q<2P
a = sin(P/2-q)+cos(P/2-q)
(ii)
If x+iy = Öa+ib/c+id prove that (x2 + y2) = a2+b2/c2+d2
Solution:
Given value is x+iy = Öa+ib/c+id
i = iota
Squaring both sides we get
i2 = -1 and i4 = 1
Q.6 Solve: 2x + 3y + 4z = 20, x + y + 2z = 9, 3x + 2y +
z = 10.
Answer: These equations
are written as
[2 3 4 [20
1
1 2 = 9
3
2 1]
10]
AX
= B
Where
A = [2 3 4 , 1 1 2 , 3 2 1 ] X =[
X,Y,Z] ,B= [20,9,30]
Therefore
|A| = Determinant of |A| = 5
Dear students get fully solved assignments
Send your semester & Specialization name to our
mail id :
“ help.mbaassignments@gmail.com ”
or
Call us at : 08263069601
No comments:
Post a Comment
Note: Only a member of this blog may post a comment.