Answer:
4.03\times10^{7}N[/tex], 135°
Explanation:
charge, q = 7 mC = 0.007 C
charge, - q = - 7 mC = - 0.007 C
d = 0.1 m
Let the force on charge placed at C due to charge placed at D is FD.
[tex]F_{D}=\frac{kq^{2}}{DC^{2}}[/tex]
[tex]F_{D}=\frac{9 \times10^{9}\times 0.007 \times 0.007}{0.1^{2}}=4.41 \times 10^{7}N[/tex]
The direction of FD is along C to D.
Let the force on charge placed at C due to charge placed at B is FB.
[tex]F_{B}=\frac{kq^{2}}{BC^{2}}[/tex]
[tex]F_{B}=\frac{9 \times10^{9}\times 0.007 \times 0.007}{0.1^{2}}=4.41 \times 10^{7}N[/tex]
The direction of FB is along C to B.
Let the force on charge placed at C due to charge placed at A is FA.
[tex]F_{A}=\frac{kq^{2}}{AC^{2}}[/tex]
[tex]F_{D}=\frac{9 \times10^{9}\times 0.007 \times 0.007}{0.1 \times\sqrt{2} \times 0.1 \times\sqrt{2}}=2.205 \times 10^{7}N[/tex]
The direction of FA is along A to C.
The net force along +X axis
[tex]F_{x}=F_{A}Cos45-F_{D}[/tex]
[tex]F_{x}=2.205\times10^{7}Cos45-4.41\times10^{7}=-2.85\times10^{7}N[/tex]
The net force along +Y axis
[tex]F_{y}=F_{B}-F_{A}Sin45[/tex]
[tex]F_{y}=4.41\times10^{7}-2.205\times10^{7}Sin45=2.85\times10^{7}N[/tex]
The resultant force is given by
[tex]F=\sqrt{F_{x}^{2}+F_{y}^{2}}=\sqrt{(-2.85\times10^{7})^{2}+(2.85\times10^{7})^{2}}[/tex]
[tex]F = 4.03\times10^{7}N[/tex]
The angle from x axis is Ф
tan Ф = - 1
Ф = -45°
Angle from + X axis is 180° - 45° = 135°
