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If the positive-value sequences [math: {xn},{yn}]\{x_n\}, \{y_n\} have limits 5 and 3 respectively, what are the limits of the sequences [math: {xn+yn+1}]\{x_n+y_{n+1}\}, [math: {xny2n}]\{x_ny_{2n}\}, [math: {2xn}]\{2x_n\} and [math: {xnyn}]\{x_n^{y_n}\} .Enter your answer in the form *,*,*,*

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We are given that the positive-value sequences {x_n} and {y_n} converge to 5 and 3, respectively. This means: - lim x_n = 5 and lim y_n = 3. - Since limits preserve simple operations under standard algebra, we can e......Login to view full explanation

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