Answer:
a. 0.8620m
b. 0.1092m
Step-by-step explanation:
a.
Given
Q1 = 5.00 μC and
Q2 = -3.00 μC
Let Q3 = the third charge (the net force on Q3 = 0)
Let d = distance between Q1 and Q2 = 0.250m
Assume Q3 is placed at a distance x to the right of Q2.
Then d + x = the distance between the Q3 and Q1.
The distance the third charge be placed so that the net force on it is zero is given as.
k|Q1||Q3|/(d+x)² = k|Q2||Q3|/(x)²
Make x the subject of formula
x = d/±√((|Q1|/|Q2|) - 1)
Substitute each values
x = 0.250m/±√((|5|/|-3|) - 1)
x = 0.250/±√((5/3) - 1
x = 0.250/(±1.290 - 1)
x = 0.250/(1.290 - 1) or 0.250/(-1.290 - 1)
x = 0.8620 or −0.1092
But x can't be negative.
So, x = 0.8620
b.
Q1 = 5.00 μC and
Q2 = -3.00 μC
Let Q3 = the third charge (the net force on Q3 = 0)
Let d = distance between Q1 and Q2 = 0.250m
Assume Q3 is placed at a distance x to the right of Q2.
Then d - x = the distance between the Q3 and Q1.
The distance the third charge be placed so that the net force on it is zero is given as.
k|Q1||Q3|/(d-x)² = k|Q2||Q3|/(x)²
Make x the subject of formula
x = d/(1±√((|Q1|/|Q2|))
Substitute each values
x = 0.250m/(1±√((|5|/|3|))
x = 0.250/(1±√((5/3))
x = 0.250/(1±1.290)
x = 0.250/(1 + 1.290) or 0.250/(1 - 1.290)
x = 0.1092 or −0.8620
But x can't be negative.
So, x = 0.1092