Evaluate : limx→3x2-9x-3 if it exists by finding f(3-) and f(3+)

Evaluate : `lim_(x -> 3) (x^2 - 9)/(x - 3)` if it exists by finding `f(3^-)` and `f(3^+)`

बेरीज

`lim_(x -> 3) (x^2 - 9)/(x - 3) = lim_(x - 3^-) ((x + 3)(x - 3))/(x - 3)`

= `lim_(x -> 3^-) (x + 3)`

`lim_(x -> 3) (x^2 - 9)/(x - 3)` = 3 + 3

= 6 ........(1)

`lim_(x -> 3) (x^2 - 9)/(x - 3) = lim_(x -> 3^+) (x + 3)`

= 3 + 3

= 6 .......(2)

From equations (1) and (2) we get

`lim_(x -> 3) (x^2 - 9)/(x - 3) = lim_(x -> 3^+) (x^2 - 9)/(x - 3)` = 6

∴ `lim_(x -> 3) (x^2 - 9)/(x - 3)` = 6

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पाठ 9: Differential Calculus - Limits and Continuity - Exercise 9.1 [पृष्ठ ९८]

पाठ 9 Differential Calculus - Limits and Continuity
Exercise 9.1 | Q 22 | पृष्ठ ९८

Evaluate the following limit:

`lim_(x -> 3)[sqrt(2x + 6)/x]`

Evaluate the following limit :

`lim_(x -> 7) [(x^3 - 343)/(sqrt(x) - sqrt(7))]`

In problems 1 – 6, using the table estimate the value of the limit
`lim_(x -> 0) (sqrt(x + 3) - sqrt(3))/x`

x	– 0.1	– 0.01	– 0.001	0.001	0.01	0.1
f(x)	0.2911	0.2891	0.2886	0.2886	0.2885	0.28631

In exercise problems 7 – 15, use the graph to find the limits (if it exists). If the limit does not exist, explain why?

`lim_(x -> 3) (4 - x)`

Sketch the graph of f, then identify the values of x₀ for which `lim_(x -> x_0)` f(x) exists.

f(x) = `{{:(x^2",", x ≤ 2),(8 - 2x",", 2 < x < 4),(4",", x ≥ 4):}`

Sketch the graph of a function f that satisfies the given value:

f(– 2) = 0

f(2) = 0

`lim_(x -> 2) f(x)` = 0

`lim_(x -> 2) f(x)` does not exist.