dekartisa da polarul koordinatTa sistemebi - ieeetsu
dekartisa da polarul koordinatTa sistemebi - ieeetsu dekartisa da polarul koordinatTa sistemebi - ieeetsu
0 3 C 4 1 0 0 3 2 0 0 0 3 0 0 0 0 1 3 D 4 1 3 6 3 2 5 9 2 3 7 12 1 4 savarjiSo gansazRvreT matricebi, romelic Seiqmneba Semdegi funqciebis moqmedebis Sedegad, Tu viciT, rom: 0 A 4 1 1. rot90(B) 2. rot90(A,3) 3. fliplr(A) 4. flipud(fliplr(B)) 5. reshape(A,4,3) 6. reshape(A,6,2) 7. reshape(A,2,6) 8. reshape(flipud(B),8,2) 9. triu(B) 10. triu(B,-1) 11. tril(A,2) 1 3 2 0 5 3 3 0 0 1 3 B 4 1 3 6 3 2 5 9 2 3 0 12 1 4 brZanebebi da funqciebi dot gvaZlevs ori veqtoris skalarul namravls ones gvaZlevs erTianebisgan Sedgenil matricas zeros gvaZlevs nulebisagan Semdgar matricas eye iZleva erTeulovan matricas det gamoiTvlis kvadratuli matricis determinants inv gamoiTvlis kvadratuli matricis Sebrunebuls diag amoiRebs matricis mTavari diagonalis elementebs fliplr gadaabrunebs matricas marcxnidan marjvniv flipud gadaabrunebs matricas zemodan qvemoT reshape formas ucvlis matricas rot90 Semoabrunebs matricas 90 gradusiT saaTis isris sawinaaRmdegod triu qmnis zeda samkuTxa matricas tril qmnis qveda samkuTxa matricas
- Page 1 and 2: eileris formula ganvixiloT makloren
- Page 3 and 4: specialuri matricebi MATLAB-s aqvs
- Page 5 and 6: conj(Z') ans = 1.0000 + 2.0000i 0 +
- Page 7 and 8: savarjiSo MATLAB-is saSualebiT Seqm
- Page 9: svet veqtors, romlis elementebic A
0<br />
<br />
<br />
3<br />
C <br />
4<br />
<br />
1<br />
0<br />
0<br />
3<br />
2<br />
0<br />
0<br />
0<br />
3<br />
0<br />
0<br />
<br />
<br />
0<br />
<br />
0<br />
1<br />
<br />
<br />
3<br />
D <br />
4<br />
<br />
1<br />
3<br />
6<br />
3<br />
2<br />
5<br />
9<br />
2<br />
3<br />
7 <br />
12<br />
<br />
<br />
1 <br />
<br />
4 <br />
savarjiSo<br />
gansazRvreT matricebi, romelic Seiqmneba Semdegi funqciebis<br />
moqmedebis Sedegad, Tu viciT, rom:<br />
0<br />
A <br />
<br />
<br />
4<br />
<br />
1<br />
1. rot90(B)<br />
2. rot90(A,3)<br />
3. fliplr(A)<br />
4. flipud(fliplr(B))<br />
5. reshape(A,4,3)<br />
6. reshape(A,6,2)<br />
7. reshape(A,2,6)<br />
8. reshape(flipud(B),8,2)<br />
9. triu(B)<br />
10. triu(B,-1)<br />
11. tril(A,2)<br />
1<br />
3<br />
2<br />
0<br />
5<br />
3<br />
3<br />
0<br />
<br />
<br />
0<br />
1<br />
<br />
<br />
3<br />
B <br />
4<br />
<br />
1<br />
3<br />
6<br />
3<br />
2<br />
5<br />
9<br />
2<br />
3<br />
0 <br />
12<br />
<br />
<br />
1 <br />
<br />
4 <br />
brZanebebi <strong>da</strong> funqciebi<br />
dot gvaZlevs ori veqtoris skalarul namravls<br />
ones gvaZlevs erTianebisgan Sedgenil matricas<br />
zeros gvaZlevs nulebisagan Semdgar matricas<br />
eye iZleva erTeulovan matricas<br />
det gamoiTvlis kvadratuli matricis determinants<br />
inv gamoiTvlis kvadratuli matricis Sebrunebuls<br />
diag amoiRebs matricis mTavari diagonalis elementebs<br />
fliplr ga<strong>da</strong>abrunebs matricas marcxni<strong>da</strong>n marjvniv<br />
flipud ga<strong>da</strong>abrunebs matricas zemo<strong>da</strong>n qvemoT<br />
reshape formas ucvlis matricas<br />
rot90 Semoabrunebs matricas 90 gradusiT saaTis isris<br />
sawinaaRmdegod<br />
triu qmnis ze<strong>da</strong> samkuTxa matricas<br />
tril qmnis qve<strong>da</strong> samkuTxa matricas