What are the coordinates of the points of intersection of the curve y= [(2x+ 3) ^2] (x-1) and the line y=3 (2x+3)? It would be very kind if someone showed the steps. Thank
The solution set for x(x+2)^2(x 1)^5(2x 3)(x 3)^4>or equal to 0 is given by x belongs to [a,b] union [c,infinity) then the value of a+B+C=______
![solving an inequality with three linear factors already in factored form (x+ 2)(x-3)(x+1) greater than or equal to 0 – Calculus Coaches solving an inequality with three linear factors already in factored form (x+ 2)(x-3)(x+1) greater than or equal to 0 – Calculus Coaches](https://mliebuykokvk.i.optimole.com/EPZtB5k-ejoTlE_a/w:1458/h:1500/q:auto/http://calculuscoaches.com/wp-content/uploads/2021/09/solving-an-inequality-with-three-linear-factors-already-in-factored-form-x2x-3x1-greater-than-or-equal-to-0.png)
solving an inequality with three linear factors already in factored form (x+ 2)(x-3)(x+1) greater than or equal to 0 – Calculus Coaches
![a. Graph f (x) = {x^3, x not equal to 2: 0, x = 2. b. Find lim_{x to 2^-} f( x) and lim_{x to 2^+} f(x). c. Does lim_{x to 2} f ( a. Graph f (x) = {x^3, x not equal to 2: 0, x = 2. b. Find lim_{x to 2^-} f( x) and lim_{x to 2^+} f(x). c. Does lim_{x to 2} f (](https://homework.study.com/cimages/multimages/16/piecewise_function16129178645164003921.jpg)
a. Graph f (x) = {x^3, x not equal to 2: 0, x = 2. b. Find lim_{x to 2^-} f( x) and lim_{x to 2^+} f(x). c. Does lim_{x to 2} f (
![algebra precalculus - X raised to power-X raised to power-3 equals to 3. - Mathematics Stack Exchange algebra precalculus - X raised to power-X raised to power-3 equals to 3. - Mathematics Stack Exchange](https://i.stack.imgur.com/eU36P.jpg)
algebra precalculus - X raised to power-X raised to power-3 equals to 3. - Mathematics Stack Exchange
![Solve the inequality f(x) greater than or equal to 0, where f(x) = 2(x - 3)( x + 2)^3, by using the graph of the function. | Homework.Study.com Solve the inequality f(x) greater than or equal to 0, where f(x) = 2(x - 3)( x + 2)^3, by using the graph of the function. | Homework.Study.com](https://homework.study.com/cimages/multimages/16/t3458830904790072567904.png)