For B < 53° Toe circle Н Midpoint circle DH Slope circle (a) 0.3 0.2 B-53 DE Stability number 4.0 0.1 1.5 2.0 90 SO 70 60 30 20 10 0 50 40 Slope angle. (deg) (b) 3. (20%) A clay layer with a thickness of 12 m is sitting on a firm rock layer with a unit weight of y = 17.5 kN/m', and Cu = 30 kN/m². If a slope is to be excavated in the clay layer...
Question 10 > In a circle of radius 3 miles, the length of the arc that subtends a central angle of 6 radians is miles. ho > Next Question Question 11 < > Find the coordinates of a point on a circle with radius 20 corresponding to an angle of 265 (x,y) =( Question 14 <> Write in Polar form: r(cos( + i sin 0). (0 < 0 < 27 and round to 3 decimal places) -12 + 6i T=...
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. (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...
Determine the centre and radius of the circle with equation x2 +10x + y2 - 14y = -70.
3. (4 points) Compute (Z - i)?dz, where y=C3(6+i) is the circle of radius 3 centered at 6+i with positive orientation.
2. Below is a rod that is bent into 4 of a circle. The radius is R 15 cm and the angle is θ 45°. The rod has a charge of q -9.55,c. Determine the electric field, magnitude and direction, at the origin. Take the electric field due to a semi-circular ring (1/2 of a circle) to be E - If an electron were placed at the origin, determine the initial acceleration and a. 2λ b. direction
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 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
Problem 6 (20 points). Determine the radius and the circle of convergence of the series co 2n +1 n=o (i+1)nz".