(a) This is essentially asking for the weight of the toboggan, which is
w = (22 kg) (9.80 m/s²) = 215.6 N ≈ 220 N
(b) Being pulled with constant speed means the toboggan is in equilibrium, so
n + (-w) = 0
where n is the magnitude of the normal force, and
31 N + (-f ) = 0
where f is the magnitude of the friction force.
f is proportional to n by a factor of µ such that
f = µ n
We have
n = w = 215.6 N
f = 31 N
so
31 N = µ (215.6 N) → µ ≈ 0.14
(c) Let p denote the magnitude of the required pulling force. The combined mass of the toboggan and children is now 122 kg, so its weight is
w = (122 kg) (9.80 m/s²) = 1195.6 N
which means the normal force is also n = 1195.6 N.
We want to have
p + (-f ) = 0 → p = f
so we just need to find the magnitude of the friction force using the coefficient from part (b).
p = f = 0.14 (1195.6 N) ≈ 170 N