The vector c has a magnitude of 24.6m and it is in the negative y direction. Therefore
[tex]\vec{c} = - 24.6 \hat{j}[/tex]
The vector b is 41.4° up from the x-axis. Therefore
[tex]\vec{b} = b[cos(41.4^{o}) \hat{i} + sin(41.4^{o}) \hat{j} ] =b(0.75\hat{i} + 0.6613 \hat{j})[/tex]
The vector a is 27.7° up from the x-axis. Therefore
[tex]\vec{a} = a[cos(22.7^{o})\hat{i} + sin(27.7^{o})\hat{j}] = a(0.8854\hat{i} + 0.4648\hat{j})[/tex]
Because [tex]\vec{a} +\vec{b} + \vec{c} = 0[/tex], the sum of the x and y components should be zero. Therefore,
For the x-component,
0.8854a + 0.75b = 0
or
a + 0.847b = 0 (1)
For the y-component,
0.4648a + 0.6613b - 24.6 = 0
or
a + 1.4228b = 52.926 (2)
Subtract (1) from (2).
0.5758b = 52.926
b = 91.917
a = -0.847b = -77.854
Answer:
The magnitude of vector a is -77.85 m
The magnitude of vector b is 91.92 m
