as per HomeworkLib guideline i have solved frist question. And other one can be solved by same procedure.... If u need other one written solution .....so please comment ... Thank you
The lovely blue rectangle has a base of 35 mm and a height of 67 mm....
For the cross-section of the angle shown below, use Mohr's Circle to determine the orientation of the centroidal principal axes in degrees and the principal moments of inertia associated with the centroidal principal axes in in4. (For θp, enter the value with the smallest magnitude.) 6.9 in 3.3 in 3.3 in 6.9 in θp = ° Imin = in4 Imax = in4 3.3 in 6.9 in 3.3 in 6.9 in e34 min312.498 max827.428xin4 in
Please help me answer this Statics , please be descriptive finals are next week The baby blue rectangle has a base of 3.3 in and a height of 1.2 in. Use Mohr's Circle to determine the orientation of the principal axes with the origin at O in degrees and the principal moments of inertia in in4, the smallest magnitude.) For enter the value with =34.516 x. min 2.115 max18.390x in
For the purple section shown below, determine the orientation of the principal centroidal axes in degrees and the principal centroidal moments of inertia in mm. The thickness of each rectangle is 15 mm. Use Mohr's Circle. (For θ0, enter the value with the smallest magnitude.) 570 im 545 mmi 585 mm x555 mm x" 585 mm 570 mm mm4 max For the purple section shown below, determine the orientation of the principal centroidal axes in degrees and the principal centroidal...
For the thick angle cross-section shown below, use Mohr's Circle to determine the orientation of the principal centroidal axes in degrees and the principal moments of inertia associated with these principal axes in mm. (For,' enter the value with the smallest magnitude.) 143 mm 79 mm 143 mm 79 mm min max mm4 Transcript Request_Form From EPCC (1).pdf For the thick angle cross-section shown below, use Mohr's Circle to determine the orientation of the principal centroidal axes in degrees and...
For the purple section shown below, determine the orientation of the principal centroidal axes in degrees and the principal centroidal moments of inertia in mm4. The thickness of each rectangle is 10 mm. Use Mohr's Circle. 650 mm 630 mm 660 mm 640 mm 650 mm 660 mm mm4 min mm4 Imax = 650 mm 630 mm 660 mm 640 mm 650 mm 660 mm mm4 min mm4 Imax =
For the purple section shown below, determine the orientation of the principal centroidal axes in degrees and the principal centroidal moments of inertia in mm4. The thickness of each rectangle is 10 mm. Use Mohr's Circle. (For 0 enter the value with the smallest magnitude.) 975 mm 955 mm 985 mm 965 mm 975 mm 985 mm mm4 Imin mm4 Imах
For the cross-section of the angle shown below, use Mohr's Circle to determine the orientation of the principal axes with origin O in degrees and the principal moments of inertia associated with these principal axes in in 4. (For e enter the value with the smallest magnitude.) 18.9 in 6.3 in >6.3 in 18.9 in- > Imax =
For the thick angle cross-section shown below, use Mohr's Circle to determine the orientation of the principal centroidal axes in degrees and the principal moments of inertia associated with these principal axes in mm^4. (For theta_p, enter the value with the smallest magnitude.) theta_p = degree I_min = mm^4 I_max = mm^4
Determine the orientation of the principal axes with their origin at O in degrees and the corresponding principal moments of inertia in mm4 for the lavender angle section shown below. 33 mm 12 mm 33 mm 12 mm θp = ° Iu = mm4 Iv = mm4 y' 33 mm x" 12 Hun 12 Hun 33 mm iirI iirI y' 33 mm x" 12 Hun 12 Hun 33 mm iirI iirI
Determine the orientation of the principal axes having an origin at point C, and the principal moments of inertia of the cross section about these axes. Solve this without using Mohr’s circle 1. Determine the orientation of the principal axes having an origin at point C, and the principal moments of inertia of the cross section about these axes. Solve this: a) without using Mohr’s circle b) using Mohr's circle (Quantities found in the first part of the question can...