for part a, you'll want to break up the acceleration induced by the 10N force into horizontal and vertical components. the acceleration you calculated (a = F/m = 10/0.175 = 57.2m/s2) is the amount of acceleration experienced by a 175-gram object being acted upon by a 10N force IN THAT SPECIFIC DIRECTION 45° from the horizontal. you can find the vertical and horizontal components of that acceleration by treating 57.2m/s2 as the hypotenuse of a 45-45-90 triangle, and solving for the lengths (components of acceleration) of the other sides of the triangle using the definition of sine or cosine...of course you really only have to solve for one of them b/c the short sides of a 45-45-90 triangle are equal in length. at this point, you can combine the vertical (specifically, upward) component of acceleration induced by the 10N force with the other vertical (specifically, downward) component of acceleration you need be concerned with - the acceleration induced by gravity. now you can use this new vertical component of acceleration (which is the sum of the accelerations induced by the vertical component of the 10N force and gravity itself) along with the horizontal component of acceleration to create a new right triangle. again, using the definition of sine or cosine, you can calculate the length of the hypotenuse (the net acceleration induced by both the 10N force AND gravity), which is your answer for part a. alternatively, you can start by breaking up your 10N force in the 45° direction into horizontal and vertical force components (instead of first calculating the acceleration and breaking that up into components). you can then combine the vertical (upward) component of the 10N force with the vertical (downward) force of gravity on the ball. this force would be 0.175kg x 9.8m/s2 = 1.715N in the downward direction. again, by creating a new right triangle with the net vertical force component and the horizontal force component, you can use the definition of sine or cosine to find the length of the hypotenuse (the net force created by combining the 10N force and the force of gravity), and then calculate acceleration by using a = F/m.
as for part b, I'm also confused as to what the question is really asking. is the person now throwing the ball 45° downward instead of upward this time? or are you referring to the downward force of the person's feet on the ground as they throw/force the ball upward?