Please double check your work and circle the correct values! (Imin, Imax, theta p) of the...
The lovely blue rectangle has a base of 35 mm and a height of 67 mm. Determine the orientation of the principal axes with their origin at O in degrees and the principal moments of inertia in mm4. (For 8p, enter the value with the smallest magnitude.) 2o riiin The baby blue ectangle has a base of 8.7 in and a height of 3.0 n Use Mohr's Circle to determine the orientation of the principal axes with the origin at...
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 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
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 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
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 =
Please see the question below, please double check all numbers and unit conversions and double check your answer. Thank you!! Below the question is a guide of how to work some of the question out. A charge is located at the origin, another charge is located somewhere on the +y axis, another charge is located somewhere on the -y axis, and a fourth is located somewhere on the +x axis. The angle of the total electric force on the charge...
Please see question & diagram below. Please double check all work and units/unit conversions. Show all work. Thank you! A negative charge with a mass of 0.4 kg is placed on a string which is placed between a capacitor which is orientated vertically as shown. The charge swings to an angle of 12.8 degrees with the vertical before coming to equilibrium. Then, a positive charge with a magnitude twice as large as the first charge replaces the charge on the...
Please help. Show work. Use the exact values you enter to make later calculations A ray of light strikes a flat, 2.00-cm-thick block of glass (n-1.67) at an angle of θ-40.0° with respect to the normal (see figure below). 2.00 cm (a) Find the angle of refraction at the top surface and the angle of incidence at the bottom surface. 6 638 Your response differs from the correct answer by more than 10%. Double check your calculations. (b) Find the...
Please make sure to double check your work for the correct answer & please show all steps! Thank you. For the most recent year, LMN, Inc., had sales of $467396, cost of goods sold of $234116, depreciation expense of $51178, and additions to retained earnings of $69054. The firm currently has 18455 shares of common stock outstanding, and the previous year's dividends per share were $1.31. Assuming a 27 percent income tax rate, what was the times interest earned ratio?...