String tension question (1 Viewer)

InteGrand

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I need help answering this question.

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Let the tensions be T1 and T2, and obtain two simultaneous equations by decomposing forces in the horizontal and vertical direction (using right-angle trigonometry), and using that the acceleration in each of these directions should be 0 (assuming we are in equilibrium).
 

Karldahemster

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Let the tensions be T1 and T2, and obtain two simultaneous equations by decomposing forces in the horizontal and vertical direction (using right-angle trigonometry), and using that the acceleration in each of these directions should be 0 (assuming we are in equilibrium).
I don't quite follow. What would be the equation?
 

pikachu975

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Horizontal:
T1 cos30 - T2 cos10 = 0
T1 = T2 cos10/cos30

Vertical:
mg = 10x9.8 = T1 sin30 + T2 sin10
98 = T2 cos10 tan30 + T2 sin10
T2 = 98/(cos10 tan30 + sin10)
T2 = 132.035 N (tension in string B)

T1 = 132.035 cos10/cos30
T1 = 150.145 N (tension in string A)
 

Karldahemster

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Horizontal:
T1 cos30 - T2 cos10 = 0
T1 = T2 cos10/cos30

Vertical:
mg = 10x9.8 = T1 sin30 + T2 sin10
98 = T2 cos10 tan30 + T2 sin10
T2 = 98/(cos10 tan30 + sin10)
T2 = 132.035 N (tension in string B)

T1 = 132.035 cos10/cos30
T1 = 150.145 N (tension in string A)
Where did you get the 20 degree angle from? The 10 I understand.
 

thejimster_73

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There was no 20-degree angle. Or did he edit his post?

Pikachu is correct btw, Karldahemster.
 
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Andy005

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Hi pikachu975, how did you get T2cos10tan30? I'm a bit confused understanding on how to get tan30.

Thanks
 

jazz519

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Hi pikachu975, how did you get T2cos10tan30? I'm a bit confused understanding on how to get tan30.

Thanks
Horizontal:
T1 cos30 - T2 cos10 = 0
T1 = T2 cos10/cos30

Vertical:
mg = 10x9.8 = T1 sin30 + T2 sin10
98 = T2 cos10 tan30 + T2 sin10
He subbed the expression T1=T2cos10/cos30 into line 1 of the vertical which gives mg = T2cos10/cos30 * sin30 + T2sin10

remember tan x = sin x /cos x, so sin30/cos30 = tan30
 

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