![Discovering a fifth-degree polynomial $f(x)$ that satisfies the conditions of being divisible by $x^3$ and having $f(x)+2$ divisible by $(x+1)^3$ - Algebra precalculus Discovering a fifth-degree polynomial $f(x)$ that satisfies the conditions of being divisible by $x^3$ and having $f(x)+2$ divisible by $(x+1)^3$ - Algebra precalculus](https://i.ytimg.com/vi/j6P63zStKU4/maxresdefault.jpg)
Discovering a fifth-degree polynomial $f(x)$ that satisfies the conditions of being divisible by $x^3$ and having $f(x)+2$ divisible by $(x+1)^3$ - Algebra precalculus
![How to solve the following equations? 1. 5+ x= 1/2-1/3'" "2. 1/4+x =1/2-1/3," "3. 1-1/2+m=3/4+1/2 | Socratic How to solve the following equations? 1. 5+ x= 1/2-1/3'" "2. 1/4+x =1/2-1/3," "3. 1-1/2+m=3/4+1/2 | Socratic](https://useruploads.socratic.org/ltBETTImRsyYZHTmgqCW_IMG_5D5A6D8AFAA2-1.jpeg)
How to solve the following equations? 1. 5+ x= 1/2-1/3'" "2. 1/4+x =1/2-1/3," "3. 1-1/2+m=3/4+1/2 | Socratic
![Prove that the expansion of (1 - x^3)^n may be put into the form (1 - x)^{3n} + 3nx(1 -x)^{3n-2} + frac{3n(3n - 3)}{1.2} x^2 (1 - x)^{3n - 4} + dots Prove that the expansion of (1 - x^3)^n may be put into the form (1 - x)^{3n} + 3nx(1 -x)^{3n-2} + frac{3n(3n - 3)}{1.2} x^2 (1 - x)^{3n - 4} + dots](https://haygot.s3.amazonaws.com/questions/1583580_1743872_ans_0b4e6c385ba74fac8a9040b343aaf90c.jpg)
Prove that the expansion of (1 - x^3)^n may be put into the form (1 - x)^{3n} + 3nx(1 -x)^{3n-2} + frac{3n(3n - 3)}{1.2} x^2 (1 - x)^{3n - 4} + dots
![Find the third degree Taylor polynomial for f(x) = x^(1/3) centered at x = 1. Taylor series - YouTube Find the third degree Taylor polynomial for f(x) = x^(1/3) centered at x = 1. Taylor series - YouTube](https://i.ytimg.com/vi/RdC48kebqrk/maxresdefault.jpg)