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An EM wave from air enters a medium. The electric fields arevec(E )_(1)=E_(01)hat(x)cos[2pi v((z)/(c )-t)] in air and vec(E )_(2)=E_(02)hat(x)cos [k(2z-ct)] in medium, where the wave number k and frequency v refer to their values in air. The medium is non - magnetic. If in_(r_(1)) and in_(r_(2)) refer to relative permittivities of air and medium respectively, which of the following options is correct ? |
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Answer» `(in_(r_(1)))/(in_(r_(2)))=4` `vec(E )_(2)=_(02)hat(x)cos [k(2z-(ct)]` Equation (1), `vec(E )_(1)=E_(01)hat(x) cos [(2pi c)/(lambda)((z)/(c )-t)]` `=E_(01)hat(x)cos[kc ((z)/(c )-t)]` `= E_(01)hat(x)cos [k (z-ct)] ""`....(1) and`vec(E )_(2)=E_(02)hat(x)cos [K (2Z-ct)]` `= E_(02) hat(x) cos [2K(Z-(c )/(2)t)] ""`....(2) From equation (1),`k_(1)=k`,From equation (2), `k_(2)=2k` but`k = SQRT(in_(4))` `((k_(1))/(k_(2)))^(2)=((in_(r_(1)))/(in_(r_(2))))` `therefore ((k)/(2k))^(2)=(in_(r_(1)))/(in_(r_(2)))` `therefore ((1)/(2))^(2)=(in_(r_(1)))/(in_(r_(2))) "" therefore (in_(r_(1)))/(in_(r_(2)))=(1)/(4)` |
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