Draw the output signal Y in the given combination of gates.
Draw the output signal Y in the given combination of gates.
Option 1 - <p><strong>Image 1</strong></p>
<p><strong><img src="data:image/png;base64,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" width="139" height="51"></strong></p>
Option 2 - <p><strong>Image 2</strong></p>
<p><strong><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAASoAAABwCAYAAACpWD0KAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFiUAABYlAUlSJPAAABlSSURBVHhe7d0HWBRnGgfwP9JBULFiQWNvsXeT2EWjUZNYsZ0tGvUSa6InnniKscUSY2+xYAd7SezdINhAQbCggi6CIoJI3fe+b3dIFPCMumVyvr/nmWfXl1136n+++WZm14IEvIWMyEMY+c0CuPSZiUmdKsBCqb+JdM05TBk/G8kt/o0felVDLqXOGGMveuugkrRpyUjRWsHe1kqpvCFtGpJTCXZ2NkqBMcaye6egMrikJECjAUqWBCwtlSJj7H2nrqOt1auB7t2BU6eUAmOMqS2oAgOB8+eBsDClwBhjagsqW1v9o9Vb9nkxxv4v8Yk2xpjqcVAxxlSPg4oxpnocVIwx1eOgYoypHgcVY0z1OKgYY6rHQcUYUz0OKsaY6nFQMcZUj4OKMaZ6HFSMMdXjoGKMqR4HFWNM9TioGGOqx0HFGFM9DirGmOpxUDHGVI+DijGmehxUjDHV46BijKkeBxVjTPU4qBhjqsdBxRhTPQ4qxpjqcVAxxlSPg4oxpnocVIwx1eOgYoypHgcVY0z1OKgYY6rHQcUYUz0OKsaY6nFQMcZUj4OKMaZ6HFSMMdXjoGKMqR4HFWNM9TioGGOqx0HFGFM9DirGmOpxUDHGVI+DijGmehxUjDHV46BijKkeBxVjTPU4qBhjqsdBxRhTPQ4qxpjqcVAxxlSPg4oxpnocVIwx1eOgYoypHgcVY0z1OKgYY6rHQcUYUz0OKsaY6nFQMcZUj4OKMaZ6HFSMMdXjoGKMqR4HFWNM9TioGGOqx0HFGFM9DirGmOpxUDHGVI+DijGmehxUjDHV46B6jSVLlqBv375Yu3atUmEsu7S0NERGRuL27dt49uyZUmWGoq6gsrHRP1pY6B9VwM/PTxdS+/btUyrvt8uXL2P06NGYNm0anjx5olTZvXv30KVLF9SvXx+7du1SqsxQVBNUUVFROHrnDs6I5/Fi76QWFkpo5srFjU8pNDQUc+bMwZQpU/D48WOlajpEhPT0dF0LRk3kOGk0GsTExHCLyghUs/UdPHgQLffvR1fx/FpCgr6oApkBlRlYppKcnAx/f39dS+6OCHC1MfX8yCTDQLboBg4ciICAAKVqfnJ+2ChHBJaWlrpHZjiqCSpra2toxd4yVTzX6kvvtfj4eN3hVa9evbBlyxalan7mbmHGxcVhxYoVusNx2bpj7wd1Hc+IjUDui9TTQ2Ve8tBKbpjmOMRSKxmQzs7OuueZLRj2/081QZU7t/5RjlAex3T9P1RANPR0TL1NODkB9vb6D3d0tNI9qoG9vf5RNqwyl5kpOTjoP1uys9M/qoEcl8zx4vw0PAuSvZN/kXzllStAUJBSMKAzZ3ywePk/kCfdGt96LEG5tn10dXm47+j450pgal5ebXHhwgE0aeKB0aN9lKrh2NrqhxfJaX30KBpTp3qIzz6C3r09MWDAFOWv5iOP9g4f3oLJk7uJDdMRq1ZdQbFipXXrRU5kXYaZlcjZv76WvZr8/Fu3QjFoUDMxfzSYMWMz3N27QmumvgI5XTK45ePNm+FivNrj9u0wMV6r0KVLP900G2K6zUHO07x5gYIFlYKZvVFQJScD3boBxjn7KkOglxiKiWGnGGqLQQ3aiuGAGDzEYPigknIKKq02GunpHuLxiAhrT7ExTNHVzbXiy8+WO420tC1ITe0m/u0oWg5XRO1/B5U8SpOtUkOMtwyq1NRQxMY2E/NFAxeXzWIn1hUZGcoL/gI5HXJ4V3J65HTJnah8TEoKx5077ZGSEobixVchf37jBpWhpuNV5DzNnx/w9gYaN1aKZvRGQSVH/sQJwN9f/9xQM0puAIGBPtji2xdOGVbo0XYNCtbrhoQ4/WeYY4+ZuSLs2NFWrIAHUL68Bzp08BErovKC15DvlfNInsCUAf+qeZXTyiw3yKSkaPz+uwcePjyCypU9UaWKeVtUcWJZyOXw4MEWhIR0E8vMEbVrXxEbaun/GRTyPYbaWOV6kpgYiuDgZiKwNKhYcTMKF+4qAl15wWvIZfD0qZy3r14ebyJz2cn/KzU1XMyb9iLIw1Co0CoR0P2Mut7KKyASEw0zHTmR81QG1Zo1QIsWStGM3iiojGnjRh94/KM/iqSmYvuc2WgwcvRfXgGNRa4E7dq1xa+/HkCPHh7w8fH5nxtlTuTlPm+6wsrPjY6ORr9+Hjh+/Ai+/94TEyear0Wl3xD1z/38tojD0G5wcHDEqVNXUKrUq1tUhibHIywsVOwwmokA12Dlys34/POub/T5cp1602X4OnK8bt0KF4fo7cVjGObOXYXu3fUtKmOR02DM7UOOu2zpFyqkP7Q1OxlUpvGE7oZepsDz5yjo+h1KVKqZNmxYT+JYgoqIUTo7d7ZSNb+2bdvI1Y169vRQKqbx6JGGWrRorvvsSZM8lar5+fpu1o2To6Mj3bt3U6mazs2bIeTqWkQ3DnJc1OLOnTCqUKG8brzWrVulVJmhyJNsRnfvzCZ4Du6FFvVro3bdBqjZsB16DZ2M7efvK694udWh1YpdlEpotXLd+/PRVGRLLHOPbOgWwLt4cS+e2coyJfmZmfPF3C3uF8kugczxUtlF8/8XjB5UmtMLMKhzT3gvO4j8bYbiP1O80LteKnYs9kL3zkOx8uwD3evUE00vS1E6pVLNsVWqkNi56R7lLSOZz5l+vmSuIxlq2rPopCFkvy8OX4kSz3IWdXodRnztjUPhb3lXSFIolk/4DtPXBcAY+w/jBtWTAMzynIpfHzjDY+4ebF89HxM9J2HphgPY6tURFnd3YuLURQhJAhxt9FGltlV/8cKfcezYUd29bUx/e4i80NLBwUF38SXTs7e3R4sWLdC6dWuUL19eqaqAVoPtMwegY59vsOdqXI4bvDbmLGb9czDWXIqFY963vAjMOj9sovdh/NhRWH3BCLfAyeM/49DSja1jqbQVyPajiRSWrpQzJQbR9x9ZEaw+pFmHH9AG340k1nzKI0bp5Gx19FGlJMVT1tE2FY1GQ82b6/uoPD3V00cV/ySO/P396eLFi5ScnKxUTefatWuUL18+3XzZsGGDUjU/0YqixMREevr0KYnWplJVgaSr5NXBVcwvRxq9LVRslVkl0cFJzcnavip5H4lSam8n5d5u+rIQqEyHHygkRSkaiBF3iY9w9kQAbot2YMN2zVFa3hvzIsfSaNmmqTiGuIYz5y7DoVhZDKpSEf3Fn4pkvbDIDDLuHsPkwX0wZOFxJJuhmafVav/4GhVV3I2vTUaiGI/cefKibt26qFGjBmzNsJzkPaFubm4oUqQI8uQRuzWVkK1LR0dHODk56VqdqmHvgrx5HMUTW+R2dsnWxZIYugWTZx5BqU/7oHeTokr17dgUb4V/jnbH3V1LscQvyKCHgMYLqtRYRGiixKGcHWqWKaG7h+9ltihS5kPkQwYCr4eieq06WObeCnPEX8qa496MFyXcxFLP0ZizbidO34wVY2h6ciMcNmwoxo8fj7Zt5UWn5vEs4jRWzfDE0H690K27B3oPGompi/wQaqbbD4sWLYalS5di06aNaNSwoVJlOUm4dRILJ0/H3ktyYT3HkdXT4P3jYhy7kah/AZ7h4PxZOJXhhnZi2ZbIIQ0yHodir88izPD2hrcYZsxdjJ2nw5Dz5YS2qP3ZQLQqHAGflb4ITTDgHl5pWRme5iQNbWovxrQKzTmdc5My/Lf/UEUxCo4dJ9Hlx6Lw7TDZPUu0ynynd7UPAunHnjXISYyHnD31vt9Oidnby++F6ICt1K9mMd18QO5iVL1aJSpgLeeLDVVuPpT2hDxRXvmeSAqin4b2ps/af0pt27ShNlkGd3cPmrcnmNKUl5tbxM4x5KCsx38OzjTMN1L/gsjt1LKAJeWp3IuOZb1eiDIo7Nel1LNxJRLtsZf+D1vXKvTZkIUU/CSHDSM1ipYOqkSwKk/TD95Viu/OeEF17wgNaCAnrBEtDXqoFF9247A3VRYTnrvTZLpi5qBKT3lGV3+dTx2ruOgWhpWtnTwupjqmCCrtcwo5uZ7GdmtCH5YrR+XEUKF2c/pqyjoKemD6fiBJ+ziYpraV88KCmg7/ic6FR5BGc59uhZ6iGb3q6uZRic4L6a6Jt8rwvd70Sa1aNGDmbnqk1Ezm2nKqmefljfbloTD1X3iSUpWXm1tq/H0KPrONhrWSOxtn6jPTjwIuBVNUvH4MQ5Z7kIMFqOqQLZS1Sykx/FcaUMVWvK8o9Zy0io4HBFJgYCCd2jqDWpXWT2+TCQeyvU/2TQeuHE7iIJIqj9xETwzUXWfkoLIQE9SIlgW/IqgOTaVKYoLMH1TPaN+/PqN84rMdClagvt6L6acxnXX/rmbsoErRkM+EjuRiCbK0y0tuZfRBVaqIsy4o83zYg1aej1VebCpaCvMdQXnF51s1+IqOaZRypptbqHUZK4J1DVoRZLrNMjViH/WvaqPbSBoMXkkPlLqpPNg1glztQAUbjKXj4eEUfj2UQkJClOEaXbsWRvfjnuXQYW1Od2i2R1kxz1xowt57Sk16QIs6VxV1S/JYHabU/hS2byKVEvO5WK+f6L5SyxSxdzJ92rQRdRmzmaKV2oseHZ9PH7mIMKs0igLjM5TquzFeH5WVFaxtZGdrIpISc+5Ws7DMpeu7ytBqRTrpa+bxDBnOpdGmyzhsOHwav/xrMKrktzTK9SBZXd8xCSO9dyK5YEN4rT2A4BthCAsLQ8i5vZjVqwZSgzZi1LCp8H9sxBvHstEiKTUXylerhT4d2qNGYaWcybUEijmLA4K0KGjiTNSDlxqJhRO+wapg/bVKjnbWJr72LgPXL15DfDJQsrk7PilbFmXLV0DFihWVoRIqVSoH17wO6rom8PkzpKTLdYeQKp7/sZkl3MSFiGgglytqViihFP9kbW0L2QX/OOQE/PZcgkZMd6aSn/4be4+expZZXVFIqb3Ixa00irnZACEBuPrQMCeCjBdUjk7Ilye/ePIAsTE5db1pkRz3FI/EMxenPPpvECBTbowvckar0XOxYcsP6PihHOdkpOoWrpHRLWz9aR0eIh+6TloEzy714aT8ya7kRxi18Gf0q1sQ8f4rsO54pPIXU7DEh529sdN3Gyb1a4yspzau+23Fb+HxsHBrjYYVTfHlSynwX+aJGT434Ormqi+ZfM+mwZXL98Wa4YBPPqmr1NJhitXEKGI1iEyMFw2KEiicL3sMuFZrifbNiuJ54DYM79oR3Xr2xYgxXpi3fo8In9dc/OycF3l1X24Yilu3X0i4d2DEoCqIUoVlUj9BRGySvvaSVMRFhIoYAyq4ucFFxneGuZpVtrC1enE/aJrxoIehCIq0gvMHlfFxkxpK9QXOFVGztJt4koiI+7H6monksrJDkbIfwK2Ii67V+yjiEo7sWI5/De6Ez8csx32rBvj3vEn4qKDxVqFMcQFrMf4/66Ft8BXG9a6nq5k8H56IFsi9aGitysEqZDEGdBatqo8+xsdiaNlpIObvvCxC7O8jJS4WCQkicGyLIn+h7MvQtlB9jFm+ET8MckfhjLs44bcW83+cjJG9u6Bdq2b4YvBUHI94xRTnzoNCufOKJ7GIjTfM/UTGW8tEk7J61fLIjzQcO+aPp0r5D9p4XPxd/uZMUVStUh4usqa2Ow+MzCLvx5hz7AIuHN2EruWU4osoBpGP48STXMjtYM6vs9TAd+IgdO/7DX5YthMhGqBt/6/Qx70cjN6eir+EHyd54khcHXjPmYCmHyhfMWpiz29cw01NjGhEXcWSqTOx88QV3I1+iDvXL+LwzpUY0b0j+k/wRbQp+gsMQF6np7t9NZctrJW7QrIqUOYTjFu6Ff5XLuLQthUYN7AtqpfMjegrZ7B92UQMGjQRZ+Ny2KlbWcNaDHJ3kmGgPYoRd4e5UK1la9QtkQuRm37Got9e/iWV8D2LsHTzQ9hWa4F2n1TN4Tqr94CtE4qVKoMyJYsjdw5fpRF9xA87Lt4C7OuiVd1SStUc0uFS0R1fDR2BEQO7on45Rxz7eRjad/fEqWgj3oFLidg3ZyK89yfg8+mzMKChaF0+N0+7JfpBNFLl3ta5DL6csBFXbkXg+tUQ3L57A0eXfI2yVnewcdp4TN90SfcDJWpn71IQzk5iN/P8DmIeZE2TDDzV3ID/yUBExtvDrUINtPhygNhJ7YJ/aDj8t09ELUcLhJ/0xe7fHyrvecHTx9A8lZ06+eDiZKDviFE61Y3kGZ1ZMIAKyGOpgg1ozNxVtHb9Glo6YyQ1KiBqVq40fEUA/XECfsgQs12e8LJntH9KF921VEY/6/cKSfcO0+DGbmJ2WFH9EVspxjAnTwziedg+6l8zjxg3C2r4rS/FKXVDizrkRVVzgYp3/IFCn8pKGvnP6yR34dTsmzWU9WSkMcXePE87ls2meb7ns31FEYk1+PDs9uQsxitfq3EUEKuuW2imdvlAzDMXGrc9XCkKcUepT00XgmUZmuf/XClmSqQjc7uK99hRk/HbSDfrX3KNRpTPTbAoQt/65XCN5L395FHHTry/Di0PNsy1dkYOKima9s8bTjVlMMnAyhxc69OYZYdI8+Iy5aDSSbp5lIY3La2bTxXcv6PzMWq5MudPdzcOoXyWoNwVetLReKVoQNqYE9S/ii1ZFnOn9cGZm0qy2YLqdeKvbqJ2ch13dKe1F+W1NiqREkrTu5UT88yG+q2+pBSlKFrQqbKoW1HvdTeUWqY0ur1/GlV2FNNTqDp9t+YMxf6xDTyh44uHUgkbkH2ZL2nP/eyh/OT0QmpaULy39DD6Pc4wF9oZvycUhdDm2x+x/ehZHNjti40+G+C3+yDOHdqG6YNaoPB7ecz3arFBWzC0e1f8fOwWyrUbgaW/eKFOAf2v0ZiOFgmaWwgKCsJtTc6nl0uUqwh5o/2zpLsQR0UGFolfxozEmqv5MXjmPPSsknku1BZ2NvoVxtLaFg66Z+pg7+iKovLr/p89hCYhW4+s+VgXQjmxrBzFAanP91+gVuP2mLQ9XPyhCBp8LPsY0xHkH5zlcNUKpZoPwtRvPkPhh5cxc0gHNKpZB/Xq1UPdmg3x5cgluOdUC6OmeaG1a9YNmHA7/DpuxQCl3BugbE59Gm/BBEEl2aBk1QZwb/8Funv0wOftW6J+5eLvZ7/UK6Xh9qFZ6PGFB345H4NqnSdg9apZaFLEDJ3H6dHwGd0SHzfrCO+tl8Wql13sg0gkirXb3r44CunOhBhKBq6u/wGT1gbCuUF3dKptg1vh4QjXDVcRFhWve1VCzB0Ei9qtyMdIzWkEDUmbhHvBx7Fl/S84FCT7XrIjbSrS5C10dvmRX/7ig1pY5EP7b6fAe3gHfGCbjPs3b+Lm7WixTHOhVtvPIFpNuHfiEIKznsiyKYDPvXxw+MByDGpRBqkP7+l+sTsyxgK1ek/FgaO74dW1KrLtQikGlwPP4q5ooHRuXgd5DfU1xkrLSh3e20O/JApYOZRq5ZWZUIBaf72MQrN3hJhQCh2Z0VJu/uTWbDSdz9pJ8TycZn2u/9rdGv3WU873HbwtDS36Uh6S6PLxtYNljXF0zdi38aRF0IJ+tXWfV3P0LrG0srt/YiZ9KP5uXX0QHblr4O84MRCtVkvajAzKyMhcoTW07IsSBKcKNOVIglLLme69ukEpvELqnYPUqzzIoeY/6cwDwy0YDqocPaPdEz8jCzEuZUZspQSjBlUC+S8dSJVkf4BzZeo3+zDFKH8xp6SoYzSkurzXLzc17jqRth2/TJFRd+jC4a3k1bOhLsSty31BW68bOlETKWDbUpo4bjyNG/c9jR079oVhFPVuLvtbRIDW+pSGiprX4oP00OgnGlLp4vLBVEh8Lop3ol1Z+4+fX6dZnWRw21NLTz+KU9GJj9d5dGY6lYYV1R28mt69Zy2DLq/9BzkjP/VZdJaydtG/C3UF1cCB+qBasUIpmMtzCt6/jEZ9NYSm+V6iZCMGVdShqVTZSWwATtVo6OpLqrnzXnp4bRv1bVJSFwxWBT+gmrWqU0kXS92/XRv3phXnTN+dHb6im+7zW3/vZ9J5lfHoHI39RLQ+xGe7NR1Ayw+G0tPnTyni/A767staum8YcK07iH67+0x5x99EhoZW9SxLuQo0p1VXsp/fexPa+AAaVdWWXOoOp1OPDHvmUzU/l6UzezYwfz6wciXQurVSNAeCVpsBbTrBwtISlpZG6sp7Gogx7u748dxjlGs2GBO+64Ii6YlIznKFfgZyIX+Z2mhS9d2+2OxtPH94A2dOnsTxw/tx4W4K8pWqgZbuTdGgXn1UKGzq7uwUnJ/fHfVG7ECzb9Zg4/w+yHobojE9Df8NXsO/xfzfQmGVxxXF8tsiLeExomKeomijvpi3eDY6VyugvPrvIyl0M7o264mbLedh7/KhKG33Fuu7NgVnF/RA0wlXMGbDYUztUNKw9zzq4kotEsRx8u3bRGr6KlcjuuHTj+xkKv6Focqoncq7zCQjlVJSUijNrIc1z+nM9Ba6+VF7wLJsd/WbQkZSNJ3bvYhG9mhPjerVo7bdhtMC39N0R/nqlL+ndLrwy2j6qPFA8gt9y+ueEi/TlC7u1HncVgMcQmanrhbVeyZ0hzdmb72KJLEESLTgMuT9BvLXLLOxQelOozHdo6by7/dVGm4dWADPtQGo3OZr/LPPx1DPlxEzY+KgYoypnomuo2KMsbcF/Bf1FC/PXVq02QAAAABJRU5ErkJggg==" width="144" height="54"></strong></p>
Option 3 - <p><strong>Image 3</strong></p>
<p><strong><img src="data:image/png;base64,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" width="136" height="50"></strong></p>
Option 4 - <p><strong>Image 4</strong></p>
<p><strong><img src="data:image/png;base64,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" 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Correct Option - 3
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According to question, we can write
Increment in height of tower = h2 – h1 = 500 – 125 = 375 m
Low pass filter will allow low frequency signal to pass while high pass filter allow high frequency to pass through
µ = A? /A? = 0.5 {A? = 20 volt, A? = 40 volt}
m (t) = A? sin ω? t {ω? = 2π×10? }
c (t) = A? sin ω? t {ω? = 2π×10×10³}
C? (t) = (A? + A? sin ω? t) sin ω? t ⇒ A? {1+ µsin ω? t} sin ω? t
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