ASSIGNMENT 16 : INTEGRAL CALCULUS
ASSIGNMENT 15 : INTEGRAL CALCULUS.
1.Write down
the integrals of:
(a) ( x5 dx
(b) ( 7x6 dx
(c) ( 4x dx
(d) ( x – 3 dx
(e) ( x⅔ dx
(f) ( 2 dx
(g) (
(h) (
(i) (
(j) ( ex dx
(k) ( sin x dx
(l) ( cos x dx
(m) ( sec2x dx
(n) ( cosec2x dx
2. Find the integrals of :
(a) ( e7x dx
(b) ( cos 6x dx
(c) ( sin ( 3x – 4 ) dx
(d) ( sec2(2x) dx
(e) ( sec x tan x dx
(f) ( cosec3x cot3x dx
(g) ( x + 1 dx
x
(h) ( x3 – 1 dx
x3
(i) ( √x dx
(j) ( 4π2 + 3x4 dx
(k) (
(l) (
(m) (
(n) (
3.y
y = f(x)
area B
1 2 3 4 x
area A
If area A = 3 cm2 and area B = 5 cm2
write down the values of:
(a) ( f(x) dx
0
(b) ( f(x) dx
(c) ( f(x) dx
(d) What is the area between the graph
y = f(x) and the x axis between x = 0 and x = 4 ?
4. Find the area between y = 3x(2 – x)
and the x axis from x = 0 to 2
5. Find the area between y = ex and the
x axis from x = 1 to 3.
6. Find the area between y = cos x and
the x axis from x = 0 to π.
2
7. Find the area between y = sec2 x
and the x axis from x = 0 to π.
4
8. Find the area between the curves
y = 2x2 and y = x(3 – x)
(hint: find the intersection first)
9 Find the area between the curve
y = 1 and the x axis from x = 2 to 3
x
SOLUTIONS (15)
1.(a) ( x5 dx
= x6 + c
6
(b) ( 7x6 dx
= x7 + c
(c) ( 4x dx
= 2x2 + c
(d) ( x – 3 dx
= x – 2 + c
– 2
(e) ( x⅔ dx
= 3 x1⅔ + c
5
(f) ( 2 dx = 2x + c
(g) ( x-2 dx
= – x – 1 + c
(h) (
= 3 x – 5 + c
– 20
(i) (
= loge x + c
(j) ( ex dx
= ex + c
(k) ( sin x dx
= – cos x + c
(l) ( cos x dx
= sin x + c
(m) (sec2x dx
= tan x + c
(n) (cosec2x dx
= – cot x + c
2. (a) ( e7x dx = e7x + c
7
(b) (cos 6x dx
= sin6x + c
6
(c) ( sin ( 3x – 4 ) dx
= – cos (3x – 4) + c
3
(d) ( sec2(2x) dx
= tan 2x + c
2
(e) (sec x tan x dx
= sec x + c
(f) (cosec3x cot3x dx
= – cosec 3x + c
3
(g) ( x + 1 dx
x
= x2 + log x + c
2
(h) ( x3 – x –3 dx
= x4 + x – 2 +c
4 2
(i) ( x1/2 dx
= 2 x3/2 + c
3
(j) ( 4π2 + 3x4 dx
= 4π2x + 3x5 + c
5
(k) ( x-½ dx = 2 x½ + c
(l) (6 + 5 dx
x
= 6x + 5 log x + c
(m) ( = log ( x – 5 ) + c
(n) ( = ( x3 + x – 3/2 dx
= x4 – 2x - ½ + c
4
3.y
y = f(x)
area B
1 2 3 4 x
area A
If area A = 3 cm2 and area B = 5 cm2
write down the values of:
(a) (f(x) dx = – 3
0
(b) ( f(x) dx = 5
(c) ( f(x) dx = 2
(d) What is the area between the graph
y = f(x) and the x axis between x = 0 and x = 4 ? AREA = 8
4. Find the area between y = 3x(2 – x)
and the x axis from x = 0 to 2
2
2
A = (6x – 3x2 dx = 3x2 – x3
0
= 12 – 8 = 4 units2
5. Find the area between y = ex and the
x axis from x = 1 to 3.
1 2 3
3
A = ( ex dx = ex = e3 – e
1
6. Find the area between y = cos x and
the x axis from x = 0 to π.
2
0 π/2
π/2
A = ( cos x dx = sin x = 1
0
7. Find the area between y = sec2 x
and the x axis from x = 0 to π.
4
π/4 π/4
A = ( sec2 x dx = tan x = 1
0 0
8. Find the area between the curves
y = 2x2 and y = x(3 – x)
(hint: find the intersection first)
1 3
To find intersection :
2x2 = 3x – x2
3x2 – 3x = 0
3x( x – 1 ) = 0
x = 0 , 1
Area = ( 3x – x2 – 2x2 dx
= ( 3x – 3x2 dx
1
= 3x2 – x3 = ½
2 0
9 Find the area between the curve
y = 1 and the x axis from x = 2 to 3
x
1 2 3
3
Area = ( 1/x dx = log x
2
= log 3 – log 2
-----------------------
1 dx
x2
3 dx
4x6
1 dx
x
1 dx
√x
6x + 5 dx
x
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(x – 5)
x5 + √x dx
x2
2
4
2
4
0
3 x- 6 dx
4
1 dx
x
1 dx
(x – 5)
x5 + √x dx
x2
2
4
2
4
0
2
0
3
1
π/2
0
1
0
3
2
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