2 :J 0 := f(x );
i f abs(x-fO )< = eps then g o to 1 else begin x:=fO; g o to 2 end;
1: \vriteln('x=',x: 10:6); { tenglam aning taqribiy ildizini chop qilish)
end.
M iso l. B erilgan
dasturdan foydalanib x - e ' + 2 = 0 te n g la m a ildizini 0,001
an iq lik d a a n iq lan g ( x
0
=
0
).
J a v o b : * = -1,840457.
T a y a n c h so ‘z va ib o r a la r . C hiziqli algebraik ten g lam alar tizim i,
analitik
usul, so n li-an alitik usul,
oddiy iteratsiya usuli, teskari m atritsa usuli,
G auss usuli,
K ram er u su li, tran ssen d en t tenglam a,
v atarlar usuli, urinm alar usuli.
S a v o lla r
1. C hiziqli alg eb raik ten g lam alar tizim in in g yagona y ech im g a eg a b o ‘lish sharti.
1. C h iziq li algebraik ten g lam alar tizim in i y ech ish d a K ram er usuli v a uning a lg o
ritm i.
2. C h iziq li algebraik ten g lam alar tizim in i yechishda G auss usuli v a uning alg o
ritm i.
3. T esk ari m atritsa va uning m av ju d lik sharti.
4. C h iziq li algebraik ten g lam alar tizim ini yechishda teskari m atritsa usuli va
u n in g algoritm i.
5. C h iziq li algebraik ten g lam alar tizim in i yechishda jo rd a n v a uning algoritm i.
6
. Ite ra tsiy a ja ray o n in in g yaq in lash ish sharti.
7. C h iz iq s iz v a tran ssen d en t ten g lam alar tushunchasi.
8
. C h iz iq siz ten g lam a yech im in in g m avjudlik sharti.
9. O raliq n i teng ikkiga b o ‘lish usuli v a uning algoritm i.
10. V a ta rla r usuli va uning algoritm i.
11. O d d iy iteratsiy a usuli va u n in g yaqinlashish sharti.
