3.2. Show, using the two properties that define a linear function, whether each of the following functions is linear or not. (NOTE: If the function is non-linear, you only have to prove that NE of the properties of linearity is not satisfied.) i. f(x1; 82) = 5x+ In(e&r2) ii. g(x1; x2) = 5xı + In(6x2) 3.3. Write the following quadratic function i the form f(x) = x'Ax, where x E R³ and A is a 3 x 3 matrix: %3D Q(x1; x2; X3) = i + 5?x3+ e*xz + 4x122 + 2x1X3 + 6x2x3

Only 3.2 and 3.3 please

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3. Answer the following questions: 3.1. Let f : R³ → R' be a linear function. Two properties define a linear function: f(x) + f(y) = f(x + y) and f(rx) = rf(x). Using this information, show that for a linear function there exists a vector a = (a1; a2; a3) E R³ so that f (x) = a'x for all x E R³. In other words, show that a uniquely defines the linear function of x. Where a; = f (e;), i = 1,2,3 and ej = ,e2 = and e3 = 1 3.2. Show, using the two properties that define a linear function, whether each of the following functions is linear or not. (NOTE: If the function is non-linear, you only have to prove that NE of the properties of linearity is not satisfied.) i. f(x1; x2) = 5x1 + In(e62) ii. g(x1; x2) = 5xı + In(6x2) 3.3. Write the following quadratic function i the form f(x) = x'Ax, where x E R and A is a 3 x 3 matrix: Q(x1; X2; X3) = a² + 5²x3 + e*x? + 4x1®2 + 2x1®3+6x203