# Use the Intermediate Value Theorem to show that the following function has a zero in the given interval. Approximate the zero correct to two decimal places. f(x) = 6x* - 3x + 7x- 1; [0,1] Select the correct choice below and, if necessary, fill in the answer box to complete your choice. < 0 and f(1) = A. The polynomial has a real zero on the given interval because f(0) = (Type integers or decimals.) > 0. B. >0 and f(1) = The polynomial has a real zero on the given interval because f(0) = (Type integers or decimals.) C. The polynomial has a real zero on the given interval because f(0) and f(1) are both negative. D. The polynomial has a real zero on the given interval because f(0) and f(1) are both positive. < 0. The zero truncated to two decimal places is

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Use the Intermediate Value Theorem to show that the following function has a zero in the given interval. Approximate the zero correct to two decimal places. f(x) = 6x* - 3x + 7x- 1; [0,1] Select the correct choice below and, if necessary, fill in the answer box to complete your choice. < 0 and f(1) = A. The polynomial has a real zero on the given interval because f(0) = (Type integers or decimals.) > 0. B. >0 and f(1) = The polynomial has a real zero on the given interval because f(0) = (Type integers or decimals.) C. The polynomial has a real zero on the given interval because f(0) and f(1) are both negative. D. The polynomial has a real zero on the given interval because f(0) and f(1) are both positive. < 0. The zero truncated to two decimal places is