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Find the length of line segment k to the nearest tenth. Find the length of line segment k to the nearest tenth. 58° 26° 3 ft A 4 ft M k E S
given a segment of unit length, construct a segment of length square root of 7.
Find the length of segment RS if S between R and T, the length of RS is 1/3 the length of segment RT, RS=3x-3 and ST=2x+6.
A point is chosen at random on a line segment of length 12. Find the probability that the ratio of the shorter to the longer segment is less than 3/20.
a) Find the length of the curve traced by the given vector function on the indicated interval: r(t)e' costie' sin tj+e'k 0<t<In2 b) Find the gradient of the scalar function f 6xyz + 2x+ xz at (1, 1, -1) c) Find the curl of the given vector field: F(x, y,z) 4xyi + (2x2 +2yz)j+(3z2+y2)k
Find the arc length of the graph of the function over the indicated interval.y = 2/3x3/2 + 4
The diameter of each segment is indicated in the figure below. Take P1 = 1 kip , P2 = 6 kip , P3 = 9 kip , and P4 = 4 kip . (Figure 1)Part A Determine the average normal stress developed at point A. Part B Determine the average normal stress developed at point B. Part C Determine the average normal stress developed at point C.
12.3.6 Find the curve's unit tangent vector. Also, find the length of the indicated portion of the curve. r(t) = 6t’i + 2tºj - 31ºk 1sts2 The curve's unit tangent vector is (i+(Oj+(k. (Type an integer or a simplified fraction.)
12.3.8 Find the curve's unit tangent vector. Also, find the length of the indicated portion of the curve. r(t) = (5t sint+5 cos t)i + (5t cost-5 sint)j V2 sts2 The curve's unit tangent vector is (i+j+ K.
12.3.3 Find the curve's unit tangent vector. Also, find the length of the indicated portion of the curve. r(t) = 2ti + () 'k, Osts5 The curve's unit tangent vector is (i + (O; + (Ok. (Type exact answers, using radicals as needed.)