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4) Geometric sequences are exponential functions. If you know any two terms in the geometric sequence, you can find the explicit form of the geometric sequence by finding the exponential regression in a graphing calculator. . Go to Desmos.com. . Select the Table option under the + menu. . Enter the term number in x, and value of the term in y, . . Add the expression: y, ~ abxi . Desmos will automatically calculate the parameters a and b. You will substitute a and b in the equation y = a . (b) to write the exponential regression. The third term of a geometric sequence is 112, and the fifth term is 1,792. a) What is the exponential regression formula? b) The base of the exponent is the common ratio in a geometric sequence. What is the common ratio for this geometricsequence? c) What is the first term? d) Using the first term and common ratio, write the explicit formula. e) Showing all work, find the sum of the first 12 terms. f) State if the sum can be found if this was an infinite geometric sequence. Justify your