(d) (i) Define: sequence of real numbers {x} converges to the limit xe R.(ii) Use the definition of limit to prove that lim30+1 3TOY 7n-4

(i) A sequence of real numbers xn converges to limit x∈R, if for every positive ∈, there exists n∈N…

Answered: ) Define: sequence of real numbers {x}…

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(d) (i) Define: sequence of real numbers {x} converges to the limit xe R.
(ii) Use the definition of limit to prove that lim
30+1 3
TOY 7n-4

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Step 1

(i)

A sequence of real numbers $\{x_{n}\}$ converges to limit $x \in R$ , if for every positive $\in$ , there exists $n \in N$ such that for all $n \geq N$ $|x_{n} - x| < \in$ .

Then the limit of sequence $\{x_{n}\}$ is a and written as $l i m_{n \to \infty} x_{n} = x$ .

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) Define: sequence of real numbers {x} converges to the limit x = R. Use the definition of limit to prove that lim RIF 3n+1 3 7n-4 7