Behaviour being used: Adaptive mode
Minimum fraction: 0
Question summary: Choose the true statement (there may be more than one): The series of functions [sum for n greater than 0 of # f5] is uniformly convergent using Dirichlet criteria for [x element of real numbers]; The series of functions [sum for n greater than 0 of # f4] is uniformly convergent using Abel criteria for [x element of open square brackets 0 comma 1 close square brackets]; The series of functions [sum for n greater than 0 of # f3] can be proven uniformly convergent by both the Weierstrass and Abel criteria for [x element of open square brackets 0 comma 1 close square brackets]; The series [sum for n greater than 0 of # f2] is divergent for [x greater-than or slanted equal to 0]; The limit function of [sum for n greater than 0 of # f1] is continuous
Right answer summary: The series of functions [sum for n greater than 0 of # f4] is uniformly convergent using Abel criteria for [x element of open square brackets 0 comma 1 close square brackets]; The series of functions [sum for n greater than 0 of # f3] can be proven uniformly convergent by both the Weierstrass and Abel criteria for [x element of open square brackets 0 comma 1 close square brackets]; The limit function of [sum for n greater than 0 of # f1] is continuous
Question state: todo