Subjective Test 2 Student Name Institutional Affiliation Provide solution to the following questions: 1. Evaluate the following: This question requires integr
Running head: SUBJECTIVE TEST 2 0
Subjective Test 2
Student Name
Institutional Affiliation
Provide solution to the following questions:
1. Evaluate the following:
This question requires integration by parts
Let u=x and 
=sin (3x)
du=
dx=1
But
= 
where u=3x
= 
[-Cos (u)]
But u =3x
Substituting u=3x in [-Cos (u)] gives;
=
Cos (3X)
Hence
= x
=
Cos (3x) +
But
= 
= 
sin (u)
Substituting u=3x in sin (u) gives
= sin (3x)
Therefore,
= 
Cos (3X) + sin (3x)
2. If
, then for what value of α is A an identity matrix?
A= 
The first step is calculation of transpose, 
=
A= 
A=
A=
I = 
3. The line y = mx + 1 is a tangent to the curve y2 = 4x .Find the value of m.
Substitute y=mx+1 in 
=4x
= 4x
Expanding = 4x
+1+2mx-4x=0
+x(2m-4)+1=0
The tangent touches the curve at one point hence the roots are equal. Therefore, discriminant =0
-4(
(1) = 0
+16-16m-=0
16-16m=0
16=16m
M=1
4. Solve the following differential equation: (x2 − y2) dx + 2 xy dy = 0.
Te integrating factor of the equation is
= 
since it is homogenous equation
= 
(by simplification)
Multiplying by 
the initial equation changes to:
= 0
= 0
Taking the initial points as ; (
, 
The equation 
is of the form ;
= 
Solving gives
Ln(x)- ln(
)+ln(
)-ln(
= 
If x= then,
ln()= 
+ln(x)
Hence
+ = CX
5. Solve system of linear equations, using matrix method.
x − y +2z =7
3x +4y −5z =−5
2x − y + 3z = 12
= 
Find the determinant
Det = 1*det
-(-1)*det
+2*det
= 
+ 
+
= 7+19-22
=4
Therefore,
The inverse,
= 
=
= 
Hence
X=2
Y=1
Z= 3
Reference
Chirgwin, B., & Plumpton, C. (2016). A course of mathematics for engineers and scientists. Elkins Park: Pergamon Press/Elsevier Science.
