Determine whether the given functions are linearly independent. 1+ 3x, 1-3x, and 1+4x2 Choose the correct answer below. O A. The functions are linearly independent because, for all x in R, the equation c, f, (x) + c2f2(x) +.+Cfk (x) = 0 has nontrivial solution(s). O B. The functions are linearly independent because, for all x in R, the equation c, f, (x) + c,f, (x) + ... + c,f, (x) = 0 has only the trivial solution. O C. The functions are not linearly independent, that is, they are linearly dependent because, for all x in R, the equation c, f, (x) + c,f, (x) + ... +Cfk (x) = 0 has only the trivial solution. O D. The functions are not linearly independent, that is, they are linearly dependent because the second function is a multiple of the first function.

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Determine whether the given functions are linearly independent. 1+ 3x, 1-3x, and 1+4x? Choose the correct answer below. O A. The functions are linearly independent because, for all x in R, the equation c, f, (x) + c2f2(x) +.+Cfk (x) = 0 has nontrivial solution(s). O B. The functions are linearly independent because, for all x in R, the equation c, f, (x) + c,f, (x) + ... + c,f, (x) = 0 has only the trivial solution. O C. The functions are not linearly independent, that is, they are linearly dependent because, for all x in R, the equation c, f, (x) + c,f, (x) + ... +Cfk (x) = 0 has only the trivial solution. O D. The functions are not linearly independent, that is, they are linearly dependent because the second function is a multiple of the first function.