UNIT-1
UNIT-1
UNIT-1
Q 1: Solve the following improper Integral
Solution:
Given, 
Q2: Solve the following improper Integral
Solution: Given,
Q3: Solve the following improper Integral
Solution: Given,
Q 4 : Solve the following improper Integral
Solution: Given,
Q 5: evaluate the integral 
Solution: we use 
Substituting a=2x
Hence,
= 
=
= 
= 
Q 6: Evaluate the integral 
Solution: we use the formula 
= 
= 
.
Q 7: f(B) = 
Solve the given function.
Solution: 
= 
= 
[Recursive function for the gamma function]
= 
[Recursive formula for the gamma function]
=
=
[By the definition of Beta function]
= 
Q 8:
B
=
= 
= 
=
= 
[because 
]
Q 9: Find the area of the surface generated by rotating the function about the x-axis over
and the curve 
Solution: we have the equation of the form y=f(x) and we are rotating around the x-axis, we’ll use the formula
S = 
We will calculate 
and then substitute it back into the equation
S = 
S =
Using u-substitution and setting u= 
and du=36x3dx,
We calculate
Plugging these values back into the integral we get,
S= 
S = 
S = 
S = 
By integration we get
S = 
S =
We wil insert back for u, and we have u = 1+9x4, and then evaluate over the interval
S = 
= 
S = 2, 294.8 square units.
THEREFORE,
The surface area obtained by rotating y= x3 around the x-axis over the interval 
is S = 2, 294.8
Q 10: Find the volume generated by revolving the region bounded by y = x2 and the x-axis on [-2,3] about the x-axis
Solution: The volume(v) of the solid is
V = 
= 
= 
= 
V = 55
