6. Find the limit (if it exists) of the sequence (x_n) where x_n = (2+3n-4n^2)/(1-2n+3n^2). 7. Find the limit (if it exists) of the sequence (x_n) where x_n = sqrt(3n+2)-sqrt(n). 8. Find the limit (if it exists) of the sequence (x_n) where x_n= [1+(1/n)]^n. 9. Find the limit (if it exists) of the sequence (x_n) where x_n= n-3n^2.

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Encoding of numerical answers: (avoid spaces) positive x: type as x negative x: type as -x fraction a over b: type as a/b or as a whole number with exact decimal part ex. 0.5 or 12.34 negative fraction a over b: type as -a/b or as a negative of a whole number w/ exact decimal part ex. -0.5 or -12.34 square root of x: type as sqrt(x) ex. sqrt(2) or as non perfect nth roots sqrt[n] (x) ex. cube root of 10 as sqrt[3] (10) or as irrational numbers such as pi or the euler constant e negative square root of x: type as -sqrt(x) ex. -sqrt(2) (do not put a space between the negative sign and the number) rationalized denominators: instead of 1/sqrt(x) type sqrt(x)/x for typing infinity or negative infinity type infty or -infty (type this if the sequence is divergent but diverges to either infinity or negative infinity) if value does not exist or is undefined: type dne for multiple values enumerate and separate only by commas, in INCREASING ORDER, with no spaces in between: ex. for 1 and 2 and negative 3 over 4, type -2,3/4,1 if you are asked to find a set S, just use the roster method (list elements in increasing order), without spaces, {-2,3/4,1}

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6. Find the limit (if it exists) of the sequence (x_n) where x_n= (2+3n-4n^2)/(1-2n+3n^2). I 7. Find the limit (if it exists) of the sequence (x_n) where x_n = sqrt(3n+2)-sqrt(n). 8. Find the limit (if it exists) of the sequence (x_n) where x_n= [1+(1/n)]^n. 9. Find the limit (if it exists) of the sequence (x_n) where x_n= n-3n^2.