Question

Problem 3: Write the Jacobian matrices of the following mappings and find all points where the map- pings are invertible: (a) f: R2 + R2, defined as f(x,y) = cos? (2x) cos” (2y), 2 cos? (x – y) - sin(2x) sin(2y) - 1) (b) f:R? → R2 defined as f(x, y) = (e-3-, In2 + y) + In(x - y)), 12 y>0.

Answer 1

Solution's of above examples are given below

и Now, 709 8182_0122 defined as firm.p2 = (osan csaj, e cosén 2-sinensiny=12 we know, Jacobias matrix = fa lstoy 24102 - aulan auport . ang - Lavron avaf o ucosamicosay , pa cestap-sinensimy=1 dup. w.r.t a partially y wanissan J = cosy on [osons =tosap.z.osex-f-sinen)-2 = -9 sin4u.co.nz the Cessim_121sing om sinen = 2.2 CDS(M-17. (=sine m-12-sinny.cosen. 2 -2 sin fan2 -2 cssem sinay! diff ug ie wirt y partially - = cos би сөзару? — = casăn, 2052y 6-sinap). 2 =-2005m. sintr.

o pe =Cost-p]=sinen on shony - = 2:203(n=p (= m-p):149-sim.cosy. 2 = e sin(en_242 — esimm bort 214,v=Fesinenosãy -2 sinag cošta esincon-mp-2caseusiang 2310124-p- osimusis ng Now, = Fzsinau costry - zsin4yosan Fesincen-yGin (entry tsineen_up) Ensincan.mp_siroma -Sarsinancosny - ninapoos in 7 7-sin(n_n)=sin(mt) sinlan-ng sin(antry 2 Tasinan 10327 vinayosan Tong = sincen-op-sincenta) stirican-mpasiolente =-25infnossãy sin (2m=222 +23indnobap sincantap) --28194 gesama staten op - esine pozim sintampay to except at uan , yani NEIN. amel n= ma to na n-odd. hence Jabian matrix and to go is invertible except at (977, nt, nein. i mama n-odd and (og

Da Gius E fin.p=re Now u on - diff wor.t log(n+D+ bogen-23), mayo v= log (M+P teloq (1-1) partially a a = enten = 2 bg (n + 124 ur by (0-12 = + p = new home to 22 (+: (a-b7catba u imel v w.ott j partially or by entpt login.p EMT Entf(n-P

214,02 1. Jawbias mafix = atm.17 — Гәyәм әvән 7. non avlor Eren Teese) e Temp Now, 240,02 telé Tiro é 1.442 이카 2 ang 42 ek . = 12 nB 72 enre to except at cool, (no 222 to 6oo. 2, (no hemele Jacobian matex is inversibles & points except some i eco2, (2, 2), (8, 2, (n.