1. Find the approximated integral value using Trapezoidal rule
| x | f(x) |
| 1.4 | 4.0552 |
| 1.6 | 4.9530 |
| 1.8 | 6.0436 |
| 2.0 | 7.3891 |
| 2.2 | 9.0250 |
Solution:The value of table for `x` and `f(x)`
| `x` | `f(x)` |
| `x_0=1.4` | `f(x_(0))=4.0552` |
| `x_1=1.6` | `f(x_(1))=4.953` |
| `x_2=1.8` | `f(x_(2))=6.0436` |
| `x_3=2` | `f(x_(3))=7.3891` |
| `x_4=2.2` | `f(x_(4))=9.025` |
Method-1:Using Trapezoidal Rule
`int f(x) dx=(Delta x )/2 (f(x_(0))+2(f(x_(1))+f(x_(2))+f(x_(3))+...+f(x_(n-1)))+f(x_(n)))`
`int f(x) dx=(Delta x )/2 [f(x_(0))+2f(x_(1))+2f(x_(2))+2f(x_(3))+f(x_(4))]`
`f(x_(0))=4.0552`
`2f(x_(1))=2*4.953=9.906`
`2f(x_(2))=2*6.0436=12.0872`
`2f(x_(3))=2*7.3891=14.7782`
`f(x_(4))=9.025`
`int f(x) dx=0.2/2*(4.0552+9.906+12.0872+14.7782+9.025)`
`=0.2/2*(49.8516)`
`=4.9852`
Solution by Trapezoidal Rule is `4.9852`
Method-2:Using Trapezoidal Rule
`int f(x) dx=(Delta x )/2 (f(x_(0))+2(f(x_(1))+f(x_(2))+f(x_(3))+...+f(x_(n-1)))+f(x_(n)))`
`int f(x) dx=(Delta x )/2 [f(x_(0))+f(x_(4))+2(f(x_(1))+f(x_(2))+f(x_(3)))]`
`=0.2/2 [4.0552 +9.025 + 2xx(4.953+6.0436+7.3891)]`
`=0.2/2 [4.0552 +9.025 + 2xx(18.3857)]`
`=0.2/2 [4.0552 +9.025 + 36.7714]`
`=4.9852`
Solution by Trapezoidal Rule is `4.9852`
