Aprēķins: PGPtxw - 1

T* (k+1) =
C(^k;_n)* a^^(n-k)* b^^k

T* (k+1) = C(^k;_n)* a^^(n-k)* b^^k$$T\cdot (k+1)$$ = $$C_{n}^{k}\cdot a^{(n-k)}\cdot b^{k}$$

T* (k+1) =

a^^(n-k)* b^^k* n!

/ (n-k)!/ k!

$$T\cdot (k+1)$$ = $$\frac{a^{(n-k)}\cdot b^{k}\cdot n!}{(n-k)!\cdot k!}$$

T =

a^^(n-k)* b^^k* n!

/ (n-k)!/ k!/ (k+1)

$$T$$ = $$\frac{a^{(n-k)}\cdot b^{k}\cdot n!}{(n-k)!\cdot k!\cdot (k+1)}$$

T =

a^^(n-k)* b^^k* n!

/ (k+1)/ (n-k)!/ k!

$$T$$ = $$\frac{a^{(n-k)}\cdot b^{k}\cdot n!}{(k+1)\cdot (n-k)!\cdot k!}$$