jonnburton
Junior Member
- Joined
- Dec 16, 2012
- Messages
- 155
Hi,
I have been working on the following problem and havign done it several times have failed to come to the solution provided by the book. I was wondering whether anybody could point out what I am doing wrong?
\(\displaystyle F_1\) components
tex] (80cos120)i + (80cos60)j+(80cos45)k[/tex]
\(\displaystyle -40i+40j+56.6k\)
\(\displaystyle F_2\) Components
As this goes straight up the z axis it's 50k
\(\displaystyle r_B = 2i + 3.5j +6k\)
\(\displaystyle r_{F_2} = -2.5j\)
Getting unit vector for \(\displaystyle Oa\)
\(\displaystyle Oa = 4.33i-2.5j\)
\(\displaystyle U_{Oa} = 0.866i-0.5j\)
Finding moments around \(\displaystyle Oa\)
For \(\displaystyle F_1\)
\(\displaystyle 0.866(198.1-240)i+0.5(113.2+240)j\)
For \(\displaystyle F_2\):
\(\displaystyle 0.866(-125)i\)
Adding the components:
-144.5 i +176.6j
Whereas the correct answer should be 26.1i-15.1j
I've been throught the worked examples on this topic again, and understand those (although they only involve one force, rather than two as is the case here). So I have a feeling the mistake might be in adding the two moments. Any information would be much appreciated, as ever.
I have been working on the following problem and havign done it several times have failed to come to the solution provided by the book. I was wondering whether anybody could point out what I am doing wrong?
\(\displaystyle F_1\) components
tex] (80cos120)i + (80cos60)j+(80cos45)k[/tex]
\(\displaystyle -40i+40j+56.6k\)
\(\displaystyle F_2\) Components
As this goes straight up the z axis it's 50k
\(\displaystyle r_B = 2i + 3.5j +6k\)
\(\displaystyle r_{F_2} = -2.5j\)
Getting unit vector for \(\displaystyle Oa\)
\(\displaystyle Oa = 4.33i-2.5j\)
\(\displaystyle U_{Oa} = 0.866i-0.5j\)
Finding moments around \(\displaystyle Oa\)
For \(\displaystyle F_1\)
| i | j | k |
| 0.866 | -0.5 | 0 |
| 2 | 3.5 | 6 |
| -40 | 40 | 56.6 |
\(\displaystyle 0.866(198.1-240)i+0.5(113.2+240)j\)
For \(\displaystyle F_2\):
| i | j | k |
| 0.866 | -0.5 | 0 |
| 0 | -2.5 | 0 |
| 0 | 0 | 50 |
\(\displaystyle 0.866(-125)i\)
Adding the components:
-144.5 i +176.6j
Whereas the correct answer should be 26.1i-15.1j
I've been throught the worked examples on this topic again, and understand those (although they only involve one force, rather than two as is the case here). So I have a feeling the mistake might be in adding the two moments. Any information would be much appreciated, as ever.
