A vector B has three dimensions along the xyz coordinates and can be exemplified by the vector sum of the three rectangular components. B=Tx +Ty+Tz =v (Tx)² +(Ty)²+ (Tz)² =v(30)² +(32)²+ (30)² : v2824 =53.14lb

Question 1 A vector B has three dimensions along the xyz coordinates and can be exemplified by the vector sum of the three rectangular components. B=Tx +Ty+Tz =v (Tx)² +(Ty)²+ (Tz)² =v(30)² +(32)²+ (30)² : v2824 =53.14lb Question 2 When forces exerts on an object which is at rest are balanced, then the object is said to be in a state of static equilibrium. In such a case the following conditions exists: The sum of the external forces on the resting object must equal zero. Determine magnitude of F1 and F3.Let TL and TR represent the coordinates ?F=F1+F2+F3=0 ?Fx =0=-FL cos 135° ?Fy=0-FR sin 45° a)?Fx=Tl cos 135°+  Tr cos45°=0 b) ?Fy=Tl Sin 135°+  Tr Sin 45°-120N a)?Fx=Tl cos 135°+  Tr cos45°=0 b) ?Fy=Tl Sin 135°+  Tr Sin 45°-18N Question 3 Let the sum of moments at a reaction = (SM = 0) and distance 5m run from A to B., and C to D for 3m SMb = 0=4(5)-Ay (8) Ay=2.5kN In the case of CD SMc=0=32(3)-Ay (8) Ay=12 Let the sum of moments at a reaction = (SM = 0) SMB= 0= 50(5)-Ay (10) Ay=10kN Question 3(b) Let the sum of moments at a reaction = (SM = 0) SMB= 0= 40(3)-Ay (6) Ay=20kN Let the sum of moments at a reaction = (SM = 0) SMc= 0= 150(3)-Ay (6) Ay=75kN References Consumer, D. S., & Allen, J. H. (2010). Statics. John Wiley & Sons Canada, Limited. Nelson, E. W., Best, C. L., McLean, W. G., & Nelson, E. W. (2010). Statics. New York: McGraw-Hill. PLACE THIS ORDER OR A SIMILAR ORDER WITH US TODAY AND GET AN AMAZING DISCOUNT :)