Question

a^4+b^4+c^4
Plz solve this​

Answer 1

Answer:

i am not sure

Step-by-step explanation:

We use elliptic curves to find infinitely many solutions to $A^4 + B^4 + C^4 = D^4$ in coprime natural numbers $A, B, C$, and $D$, starting with $$2682440^4 + 15365639^4 + 18796760^4 = 20615673^4.$$ We thus disprove the $n = 4$ case of Euler's conjectured generalization of Fermat's Last Theorem. We further show that the corresponding rational points $(\pm A/D, \pm B/D, \pm C/D)$ on the surface $r^4 + s^4 + t^4 = 1$ are dense in the real locus. We also discuss the smallest solution, found subsequently by Roger Frye.

Answer 2

Step-by-step explanation:

While studying a thin slice of cork, Robert Hooke saw that the

cork resembled the structure of honeycomb consisting of many

little compartments. Cork is a substance which is obtained from the

bark of a tree. This was in the year 1665 when Hooke made this

chance discovery through a self designed microscope