Determine whether the functions f_{1}(t) = 4t - 4; f_{2}(t) = (4t ^ 2) + 1 , f_{3}(t) = (4t ^ 2) + t are linearly depend

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Determine whether the functions f_{1}(t) = 4t - 4; f_{2}(t) =(4t ^ 2) + 1 , f_{3}(t) = (4t ^ 2) + t are linearly dependent orlinearly independent. If they are linearly dependent , find alinear relation among them . W(f_{1}, f_{2}, f_{3}) = If possible ,find , C_{1}*c_{2} and such that c_{3}; c_{1}*f_{1} + c_{2}*f_{3} +c_{3}*f_{3} = 0 NOTE Enter an expression in terms of f_{1}, f_{8}and fs, where not all coefficients are 0. If this is not possible ,indicate that using the checkbox =0 not possible Therefore , f_{1};f_{2} and are Choose one f_{3}

Determine Whether The Functions F 1 T 4t 4 F 2 T 4t 2 1 F 3 T 4t 2 T Are Linearly Depend 1 (60.93 KiB) Viewed 21 times

Determine whether the functions fi(t) = 4t - 4, f2(t) = 4t² +1, f3(t) = 4t² + t are linearly dependent or linearly independent. If they are linearly dependent, find a linear relation among them. W(f1, f2, f3) = If possible, find C₁, C2, and c3 such that c₁f1 + c2f3 + c3f3 = 0 NOTE: Enter an expression in terms of f1, fe, and f3, where not all coefficients are 0. If this is not possible, indicate that using the checkbox. = 0 Therefore, f1, f2, and f3 are Choose one not possible Choose one linearly dependent. linearly independent.