Þetermine the requested value(s) 1) 2) 134 113 2 02 63 m arc 1 = m<...
2. Find the value of c so that the function is continuous everywhere. f(x) = 02 – 22 r<2 1+c => 2 {
(2 points) Find the exact length of the curve y = In(sin(x)) for #/6 <</2. Arc Length Hint: You will need to use the fact that ſesc(x) dx = In|csc() - cot(3) + C.
cot(theta)=2 where 0<theta<pi/2(pi>
c. cot0 = 2 where 0 <
Find the laplace transform of: (p², Ost<2 g(t) = 17,2st -25 O e C(5)=-63 ++)+25+ G(s)-()e2+{e-25 G(s) = -43 + + 3) =25 G(s) =- + )e-2s+že-2 +
Given the function: 6x - 1 2 < 0 63 - f(x) = 62 – 2 x > 0 Calculate the following values: f( - 1) = |-7 f(0) = f(2)
Find the arc length Lof x = f(t) = 9t + 14 y = g(t) = Si Vu – 81du where 0 < t < 16 =
. c) + < 2 b) 2 + 3x 27, 0. Solve for r: r' + 2.r < 2.1? +12
Theory 00 2. Prove that if Vlan] < 1 then an converges. n=1
(9) Solve the absolute value inequality 11 - 4x < 7 and graph its solution set on the number line. (9)
Help with my homework question please.
11. Calculate the surface integral, (16** +°)e="ds, where S is the cylinder x² + y2 = 9 for 0 <<1.