7/4/20 linette at intihe'te keuse 12 x²+3x-1 2+x+2 242-3 1 + 3-1 X X2 lo 10y4+2x²+201...
4. Simplify and state the restrictions. 2x+8 4x+16 a) 3x 6x2–5x+1 b) x2-4 Х x2-x-2 x2-3x 2x2 4 1 c) x2+3x+2 + 1 x2+4x+3 11x d)- x2+3x-28 X-4
Integrate: 3 X Wix 12 X SX 3. (3x²+2x+5 de J (x-1) (x²-x-20). 4. 15x²-3x-2 d. "JX² - 2x² ay 1. mo Fuid appropinations using numerical integration 24 a) with midpt method . b) with trapezoidal method ) n=4. a) Midpoint b) Trapezoil al
2x f(x) = ex+ f'(x) = (3x + 2) ex+3 B f'(x) = (x2 + 2x) e*+2x-1 С f'(x) = ex®+2x f'(x) = €3x+2
evaluate the limit if exsist e) lim x2-3x+2 *2-2x x-2 (x2-3x+2 x2 x2-2x yes, this is the SAME limit as in parte) Demonstrate ANOTHER (still algebraic/non-numerical) way to find this limit than you used in parte).
just number 16 15-42 Find the limit or show that it does not exist. 1 x2 3x 15. lim 2 16. lim 3 x00 x x +1 2x+ 1 ズ→00 4x3 6x2- 2 x-2 17. lim 18. lim x21 2x3 4x 15-42 Find the limit or show that it does not exist. 1 x2 3x 15. lim 2 16. lim 3 x00 x x +1 2x+ 1 ズ→00 4x3 6x2- 2 x-2 17. lim 18. lim x21 2x3 4x
7) For f(x) = x - 4x + 9x? - 201 + 20 a) List the potential rational zeros. b) Determine which values from part (a) are the real zeros of the functions. (You need not show work.) 8) Find the complex zeros of each function. a) 2-10 b) x-1=0 c) 4 + 13x2 + 36 = 0 d) 2x + 3x + 2x + 3 = 0
1. Evaluate the expression when x=-5 - 3x² + 2x - 7 2. Simplify: 4+ 2(x + 3) – 7(2x - 5) 3. Subtract: (5y² + 4y + 3) - (y? – 7y + 10)
Determine the convenient x-values as defined in class for the following 3x-1 t? (х+3)(2x – 7) (x2+1) пит T + пит Т2 + num х+3 + num 2х7 num + 12+1 O7/2 0 3 -7/2 -3 2 7 -2 1 -1
Ar) - 12:45-v 2x+ 5 - Vx+7 If for x + 2; (2) - and iffis continuous at x = 2, then k = Select one: b. 1/3 for x#1, 2 3x(x-1) x2 – 3x + 2 Suppose 3 f(1) = - 3. $(2) = 4. Then f(x) is continuous Select one: a. everywhere except at x=2 b. everywhere except at x=1 c. everywhere. d. everywhere except atx=1 and except atx=2 s(x) = *--* for x80. If 2x f(0) =...
using the general power rule Question 1 let y = (x2 +x)3 Find y' 2x+1 3(x2+x)2 3(x2+x)2 (2x+1) • (x2+x)2 (2x+1) recall general power rule formula has three parts: [u(x)" ]' = n u(x)" 1 u'(x) Question 2 let y = (x3 +x2) 1/3 Find y' (x3 +x2) 1/3 (1/3) (x3 +x2) 1/3 . (1/3)(x3 +x2)-2/3 (1/3)(x3 +x2-2/3 (3x2+2x) recall general power rule has three parts. [u(x)"l' = n u(x)n-1 u'(x) Question 5 let g(x) = 1/(x3+x2)3 find g'(x) (x²+x23...