Answer:
The force on each wire is
[tex]T_1 = 12.5 \ N [/tex]
[tex] T_2 = 25 \ N [/tex]
[tex] T_3 = 50 \ N [/tex]
Explanation:
From the question we are told that
The acceleration at which the elevator will stop is [tex]a = \frac{g}{4}[/tex]
The weight of each section of the wire is [tex]W = \ 10 \ N[/tex]
Generally [tex]W_1 = W_2 = W_3[/tex] here [tex]W_1 , W_2 , W_3[/tex] are weight at each section
Generally considering the first section, the force acting along the y-axis is mathematically represented as
[tex]\sum F_y_1 = T_1 - W_1 = m * a[/tex]
Here [tex]T_ 1[/tex] represents the tension on the wire at the first section while [tex]W_1[/tex] represents the weight of the lamp at the first section
So
[tex]T_1 - 10 = m * \frac{g}{4}[/tex]
=> [tex]T_1 - 10 = \frac{W_1}{4}[/tex]
=> [tex]T_1 - 10 = \frac{10}{4}[/tex]
=> [tex]T_1 = 12.5 \ N [/tex]
Generally considering the second section, the force acting along the y-axis is mathematically represented as
[tex]\sum F_y_2 = T_2 -T_1- W_2 = m * a[/tex]
=> [tex] T_2 - T_1- 10 = m * \frac{g}{4}[/tex]
=> [tex] T_2 - 12.5- 10 = \frac{W_2}{4}[/tex]
=> [tex] T_2- 12.5- 10 = \frac{10}{4}[/tex]
=> [tex] T_2 = 25 \ N [/tex]
Generally considering the third section, the force acting along the y-axis is mathematically represented as
[tex]\sum F_y_3 = T_3- T_2 -T_1- W_3 = m * a[/tex]
[tex] T_3 - T_2 - T_1- 10 = m * \frac{g}{4}[/tex]
[tex] T_3 - 25 - 12.5- 10 = \frac{W_2}{4}[/tex]
[tex] T_3 - 25 - 12.5- 10 = \frac{10}{4}[/tex]
[tex] T_3 = 50 \ N [/tex]
