factorize x2 +7x - 30
1. Factorize and the irreducible quadratic factors if there are any. as much as possible the following expressions, identify then the linear factors (a) -9 C)-3) (b) 3r2+ 5r-3 (e) (+7x-4)(-2r+2+) 2. By looking for evident roots in the range (-2,-1,0, 1,2} factorize as much as possible the following expressions. Finally, as in 1. identify linear and irreducible quadratic factors if there are any (a) -3r+2 (b) 2r +22 + }x (e) -2r+5-5r2+3r-1
Question 7 7x - 21 Given f(x) = - x2- 7x + 12 a. Determine the domains of f(x) and g(x). b. Simplify f(x) and find any vertical asymptotes. c. Complete the table. ix) g(x)
Evaluate the following integral using trigonometric substitution. 7x² dx (121 + x2) 7x² dx s (121 +x?)? (Type an exact answer.)
If f(x) = 4 x2- 7x + 5 , then Enter the answer here f'(x) = Done Done
Using the definition of the derivative to calculate the derivative of f(x) = x2 + 7x en X = 1 is obtained a. 1 O b. 2 O c. 7 d. 9 e. There is no right alternative
Find the factors of the equation y= x2 +7x+ 6. 1. Verify your answer by expanding the factors. y =x2-16 Find the factors of the equation Verify your answer by expanding the factors Find the factors of the equation y = x2-8x +16 3. Verify your answer by expanding the factors 2.
Q5. Solve the following equations. b) 2-7x+2 c) 7x2 – 23x = x2 – 20
Evaluate the integral. 4) S -2x cos 7x dx Integrate the function. dx (x2+36) 3/2 5) S; 5) Express the integrand as a sum of partial fractions and evaluate the integral. 7x - 10 6) S -dx x² . 44 - 12 6)
(25 points) Factorize Write a String method factorize(int n, int m) that when given a positive integer n and an integer m, returns a String representation of how many times n factors into m. Must use a while loop to get full credit. (25 points) Print Product Table Write a void method printProductTable(int n, int m) that when given two positive integers n and m, prints an n (rows) by m (columns) product table. Note that entries in the table...
4x3 52-7x 18 dax Consider the indefinite integral x2 4 Then the integrand decomposes into the form d C ax b 2 2 where a= b= d = Integrating term by term, we obtain that 4r3 5x2 7x 18 da 2 4 Preview +C Get help: Video 4x3 52-7x 18 dax Consider the indefinite integral x2 4 Then the integrand decomposes into the form d C ax b 2 2 where a= b= d = Integrating term by term, we...