Physics
Grade-7
Easy
Question
Key or switch in the circuit is placed
- Left side of the battery
- Right side of the battery
- Anywhere in the circuit
- Near the positive terminal of the bulb
Hint:
Anywhere in circuit.
The correct answer is: Anywhere in the circuit
A key or switch can be placed anywhere in a circuit, wherever it is placed we have control to stop the flow of current in that particular branch of the circuit.
Related Questions to study
Physics
Which one of the following devices is not based on the heating effect of electric current?
Which one of the following devices is not based on the heating effect of electric current?
PhysicsGrade-7
Physics
Why are symbols used for electric components?
Why are symbols used for electric components?
PhysicsGrade-7
Physics
Electric voltage is measured by a device
Electric voltage is measured by a device
PhysicsGrade-7
Physics
When two or more cells are joined together, it forms a
When two or more cells are joined together, it forms a
PhysicsGrade-7
Physics
When excess current flows through the wire, it shows
When excess current flows through the wire, it shows
PhysicsGrade-7
Physics
The presence of current in a circuit is detected using a __________.
The presence of current in a circuit is detected using a __________.
PhysicsGrade-7
Physics
Which one of the following is a safety device?
Which one of the following is a safety device?
PhysicsGrade-7
Physics
The device used to make or break an electric circuit is
The device used to make or break an electric circuit is
PhysicsGrade-7
Physics
Electric current is measured by a device
Electric current is measured by a device
PhysicsGrade-7
Physics
A battery consists of
A battery consists of
PhysicsGrade-7
Physics
The given image is a symbol for ______.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJwAAACACAYAAAD+rACtAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAB8ySURBVHhe7V0HdFTnlc7Zs7tJNrGzSZyyafbGac7ajuMWd8eOY8cFMGCa6KBGlxBNoqggqgBRRJEoojfROxICRBESCBBI9C6BEEia0fTyZubbe++MYoyxwY79YIb/O+c/kubNm3lP73u33/u+AQUFHaEIp6ArFOEUdIUinIKuUIRT0BWKcAq6QhFOQVcowinoCkU4BV2hCKegKxThFHSFIpyCrlCEU9AVinAKukIRTkFXKMIp6ApFOAVdoQinoCsU4RR0hSKcgq5QhFPQFYpwCrpCEU5BVyjCKegKRTgFXaEIp6ArFOEUdIUi3K3g8328vN7AuuE1hS8NRbgGaBp8Fiu8BgO816/De/UqvFeuwHv5hlVFr127Bl9tHXxmM3xOZ2BnhTvF/U04klZMGm9dHTwXLkE7Ugb3vmK4d+6Ce1s+3Ll5cG/JDSz6PY9e274T2p5CaIcOw3P6DLzVREC7PfCBCrfD/Uc4Uo0+s4WkVxU8J09BK94P1+atcC5YDPvkqbCNSoMtZQRsScM/uRIDKzkV9hFjYJ8wGY5Z2XCtXkcE3AvP8RPwVlTAR+T1uVyBL1O4GfcX4dwaqcTrIsmEZHMXCHFsgxNhje4Fc9uOMLVoA9NHbWBu1Vb+NrfvTKuT//fW7WD+KMy/WneApWs0rHGDYB81Fo7ZRL6166HtK4Ln4kX4bLbAlyrciPuAcCTRrDaxwbTDR+DasBmOqZmwDU2CtXdfWKJ6wdI5EpYwIlRLIpkQrZOQydKdtvWK8a/uvWGJ6AZL+y5EtvYwtyDytSHSdegKazi9l95jSxhKBJ4I59JlcO8thPf8BfjqTYDHEzgWhZAnnK++Htqx43Cu3+hXmQPiiSREGpJkFpJalh4xsA4ioiSRqhw5FvbxE2HPmAHn7LlwLlxM5FkuBHIuXkoScT4c07NEKtpHj4M9dTRsQ4i4ffrC3Ckc5jAiYofO9Jm9YRsxWvbVDpT4HQ1FOkHIEk6cAfIy3WRf2efMhTVhGEmtKJJkHUiShZFUC4dt4GA/uVasJodgO7S9++A5SM5A2XF4zpwl1XgJnspK/yL7zHPuvNhqnkOl0IqKoRXshmvdBrLl5oidx0RjFcxq2dyuE6yx/YXkLnI6NHYwTCTtOMRyHyM0CWd3CGFc6zeQ1BotRDN/1FrUpjUmDvbho+DInCVk0YpL6L3nJOQhBr/JTPYXeZ1s+Gvax3E4llBuN3wOhz8kYjDCx+ETIqVWWgoXebSORUtI+k2Ctd8gWDp19duC7TrDGj8EjvkL4T54UDzi+xmhRTgOc5DNxBLKuSxHnAFzG1JzjZrCQhfeNiyFVOMyvyRjiVNTCzC5NCITB3a/KBoCwyRNfUYjPGwnkvRzrVlHqjmd7MMeMDVtAXOzlmLj2TOzyLbbC291tZ/M9yFCinBsr3kOHIRjZjZd4L5+CdO8FXmgPUXyuDZtkVAISych2dcAn9Xql3rkNLDnaiWb0dymHUwftoCFnAv72HES3/Nevnxf2nUhQji/ZNPI/nJmziTJ0hOmRs1gatmOPMdhcJKq40Ctt6aGbDtSlV93eopVr8UCL0lR9+bN5GCkkc0YATNLO7Lt7ORQsAr2VFV9/cdyjyEkCCee6MFDcGTNhpXJ1ri5n2yJqWTHbYTn1Om7kw0gdeu9WgVtZwEckzP8KrZJcyJdR9jItnRty5cUGlzuwA6hj6AnHKswrayc1NdciZWZSXWxp8gZA/e27XRBq8XQv2vgHC3ZinJDkIq19OgDE6l5c4cusKeNh3tHgaTH7hcENeF8pLo4VOHMWSkhCFOTjyQbwJF/zof6rtcE3nn3wZ6vduSopMM4oMzHyqEZ+8Qp0Mju5BvnfkBQE46rOty522BLHuFPO7VsKxkETrZzCgvee8soF9VfchD2GVkwd44kR4JI172PBJU9Z8+SJA796pOgJRyrSXYE7OmTST11JTXVmjzCBDhXrYG3sjLwrnsPTDp3UTFs5EiYwzqIJ20dkgjXxs3wXiF7LsSdiOAknMsF76VLcC5fASurpw+awtwlEo7sedBOnJS42L0Ln6S6OOhsTRhKhGsthQH2cROg7S8J+aR/8BGOJICo0vztsKWMlDibmaSEbfgokhz74bVYAm+8dyG2J3nOrEo5HSaea3RPOBeRaj1/wZ/lCFEEHeG41ky80mkzYCGpZiY7yNonDs5lKyQ9FSzg6mL2XO1pE8T+ZNVqS0qVG4lvqFBFcBGOpZuhDq6tebAOTIC5WSsJqHIFB6eUfPa7GP74EhDVunqt5F5NLcJgiewOZ9ZseNgsCFEEFeFYunnOn4djwSKYw6PFUbANHkZSYQe8tcGXFBdpzVJuyjR/TV6b9rCTx81pMZ8WmsHgoCIcV1q49xVJXpQ9U3NAunlOnaELFIR5SZ9XnB/XWnIgBg0Wwllj+kny31tbIxI91BA8hPN44Dl7zu+Z9o+XqlsLXRznqrVEREPgTZ8Dr1c8QCktYtV7i4vJyXQOwEqJ0i1iYj7+DJJK8jmcKnPfUPFBn+fjrAJXjnAJE3vKXBFyG9Lw8bg5Njcu3V/GTjeSPWM6tPJyfzA4xEgXNITjpDsHTR0Tp4j6MbfiXGmKdFHdSZ6UScLqmB0Oz4WL8N4UfvB5yT6sNUDjxpry45ISk9KjAPzdXQZ4SCJ5zpyBt6JSmnEaINuv18hn840hLYZM3NuVIfGNRJ4pp+bMnSJgIruUi0W5aJMbfW48hlBA8BCOU0MFu8WT4wYWc8dwIZ+khdy3t3e4Bs2Vly+hCE6ae/hiNkgPTrITedylR6X6l6WoVnrkE70IvL+75JCUOEnh5r5i+Ko/9ia9RqNIKue69XCSI+DmmrtLFXfkyHBWxJmzSnLBUsbUvQ8cC5dIzV6o9UMEDeGEEEQY2+AkqaK19I6T1j7x6G5zUVjKSCiFjHP2CDl/yeRokIwsnSQnu4zUNTkhnB7jyL/P/rEU9JSVwTl/obQJcsyPSek9dyGwlY6vogLOJcska2CNHwpH9ny4yXP2chPNbcDZB5ZovJ+JTYWo7lL5wsesCHc3QJKIq3PdRALujLJEdJegr2tLHjyVl+lqf7baYbuMPViWTNYeMTD9o5GUnHODi4fjdmyXESncu0h6Dk2GqdGH0mDjmJ4parEB2q494hH7CwTImyTHhbvAGr7bc/w47GPGSX60/v0PYSXSOnO3iZq9HVjdc3uhOEPRPWHp1lNuDq7vC7XK4OAgHKlMtplcy1fC1n8QrD1jxLBmFceq7PMMa1HFx4gM0zIlBWZ87CnUv/Y32Imw2hEiDBn4HDDmIk1uETQ+/mfUv/Q6bCRtPAdKiElEKCIVFwRwoNn45NMwvvi65G1dZD9yZoNVurZ/P2wDE1D/l1dg+NOzsIRHwbGESH3xUuBIPgdEKpbUTlKj1kFD6MboI04Ee+SfcExCAMFBOJIA3uMn4JozD7Y+fSV04Ji7ANrpO6iwIOnl3VEAO11I4zMvwvCjX8Dwmz9KL6l7q7+qhC+2Y2w6TEQ0w49+DuPvHoe1cwTcZItJYw1LSFKhXLFb99NfwvC/vycbsquoVenmqr4G14aNogqNjz0Jwy9/DfP7TeAi1Y0jZUSo26tFL0lqbs7mOj5rz1hp9GGHiBuCQgnBQThuUCkpgZNtMFI31th+0gzjuVR5+4vJAeFVa+Egz9b4yO9R980HUUek4kJN7jvVjh0jdUrqkiSW8Q9PoO4/vgvDT34Fc5PmcMzIkho2rkpxTJkK0xtvo/bbtP93f4D6dz6AfSpJ2f0HZDnod26WqfvVo6h74Acw//k5uOMGAvk7AMvta924SNO9p1DsS1b9tnjyVDeQHXkHNmAwISgIx+14PL/DkTZeVBU3HosNxvYbqTxWqF5Sqx6y19yk3pzkBNjJIbBbrbCT4W5LnwLzu01g+J9HUPed76Pux7+A6e/vwj5qDJyrVsMxZy4snSJg/PUfUPetB2H46cMwvf0+bMOSRdU6s0my9u2P+udeIsI+gLr/fAD1L7wmzgV3hznmLZCboP6vb6HuZw/T9u/C+PNHJPVmz5wFR9kx2MkxcJD65mNzcYaB1KiX7Uf/KZIkNUArJuLyTRXdG7bYgeK5Sl1fCCEoCCchiZ2kFokgnDtlwrmWLfcb9UQ0l0eD0WxCRWUlyk+cwIFDh7B3717sy83D4ckZOBXWEZVPPIPrRALDLx9F/aN/gOmFV2Hp2IVspgRYe8USAd+D4dHHYPjZIyTpnkT9G+9IEJYriaXBuXEzGP/4FOoe/BEM3/sx6p99CdZIcl7Ia7X2HyhFBMY/Py+EqyVCVj/wQ1ykv49364GS2XOwb/t2FJKdt5+Oray8HBcvXkSdwQCnRvYpnyQR0kM2qZMkJfdl2HrRTUVer9TIhRCCiHC7pHTc0iWC7Lg4uEmygBtQCCa7DSfOnsGWvDxkL1yIyTNmYMKECchISsLiTl2Q/9JrKP+/p3CVSFb/9nuwvPYmTE//haTUqzD97R2YXn9LyGJ86jlxKEzvNiYJ9wGR7m2SWn+X1+qff5kchmfIRvsT6p98VvZhFcqOhonstfoXX0M9fSa/p5YkZeUjv8Uh+n1ToyaYGxODjLFjkZ6RgfRp0zA7OxubNm3CMVLnBosZGnu6JhN83HUmhOsBW28mHN1UQVQBcycIDsJx/dvuPdLTySENG6kvLWclECjjqTbUIXfHdoxOS0P33r0R0b07evTogYSoKExpE4Z1776Pw0SOalKLHK6wk2Rjwhl+8WsYH/4NjOQEGH//OJHxXZFmFnqfuWlLIVcdqVcDkcdInqfpTZJ6zf0d/KwuTSQF6+l142//iPonnvZvbxkGY9uOqKCfRc1bYUnrNkiLCEcCka57nz7oGBmJbnRsY4mAW3K34tLVKrg4cM11fKT+ndOIcN16iQp3rlipVOrdAHuKHHawT5oirXZ2uhgaeYgIXIxKkoCLcpYjmojWqEkTtGrTBr169cLIwUMwPzkF21OG4yRJDsPGzXBu2ATn8JEwk+QykC1n+P5PyLZ7mCTcc7BEREu/gSNrloRA2But/ffvwPDQzyRUYuXtI8dIvM3avTfqX35DvN66Bx5CPUlQHo7DpePW7PmonpONo+RobBg9BpnDhyN12DB069kTjZo1k2OMIQIuWbYUp0i1OsiuYwmH/SXinFh79iGnYbCMquCO/lBCcBCOjH8PqR8H2UI8YsvOEo48TFT4g75MuHlLliCcpEeTDz9EJEk2liA5S5diz9ZcHN9VgKtHj8J2tVrylm6yjSxtO8Hw8G9hePAhkXSmf5DXOW6CBIA59WWLHyISrvYb3xRSmt5r7N++JVeIwMMJ618jJ+E7P0Ttv32b1OwzJHn707ZNcJ88BfOp06g8XIrSggLkb9iAJYsWISU1FW3atpVj7EPSbvmKHJy9fBkuJhzdPL7tO/xk5tFfKSNkCqfPFlrdXEFBOAmMkkPgzPFXitjIyHdNzwLKj0vg9lptLVaTTRQ/eDC6deuG4SkpWLFiBcqIZNfIzqun7eyxshcrfax7CmEbkox6jsv94KcwkErk2W9OIhKXC3GlBjcu15OdVvtf/y2xOZ5RwiqOU2AaEclO203vf4i6h36O2m99j2y8V2AnySkd/nYH3HRcNrMZdTU1qKTPPFhSggVkX8b164fwiAikjhiB/J07Uc3OAlegnD0HbdkKyaRI4HcskXtvYciVmwcH4QhcC8f5TZY8ViKHI3U0fDsKAHq9ntTRngMHMHX6dCSRozBp4kTk5uaimiTfp0Ck85w+C+esuUSYpuK1Gp95QbxNjrkxIXnuB4ddWEUaHvkdjBwoJruK7UjZfqUKTvKSua+UPVeWlOZGzf21edyTcBM4VHOpogIbSNINJ/U6cNAgzJozB+UnT8LGN4HTBS8n/idlwBLdU5wGx6Sp0A4cUqmtuwWpG8vbJvlMC3fWx/SDlyQCLl4S6VV+7hyW5uRgBEkOXsuXL0flZ7QLsiHuJvLylEvjU8+j/u/vwTEtU6ZkcpiF7SYXfZe1/yDUv/qmeKk8eFA7Wib7c72be/duSX9xOKX+r2/D2ocLJ9f7JzLdBDeR5uzZs1hBxzeMbLkEksR8rJevXYOErW12eLgwYUiiv86Ppe2MmfBwloIIGUoIHsLZbHAX7BJJxP2cHI/Tps4gtXoMGtlAlXW12Lxtm5CNDfKJJOWOkkq9FXwkEbUickJSR0lYwxLdC66VqyT4KtuJwJw94GGC7KTw9CVn5ixRpw3gKUxMUmv3PmRzxcm8OfeBg/DeIqtQT2pzPzk9mZmZ6EcqdcjQoVhD0q6ObiL/G0xwr1wtOWITecc8DoLzqlzJLLncEELQEI4T+Fz7Jo3PnSKkHNs5gtQqEYMrQoy0fR/ZSaPHjEF4eDgSExOxb98+Eli3SOxzwv7MObjIJuOuKWnCKSr2z4ojsATj/CrXvdlpG0+45LzmjdKL1apr3UY4MmaQMzOPbobd8JATc6vaPFbt2+hm4Nhgv7g4uSlyt2+HuaFwtPoanPMWkMSNlLkjUoC5OVCA+TmFCcGI4CEcp65On5EcqrXvAH/DyYB4eMkL5eS+Ez6Unz6FSZMno2vXrhgwYAC200XldNKn4CYjncjj4TzpzgIpDWJngUnN4DJyGUJdekQMd42I7OXJ5Dd8lqSiDpUSEWn/4gO0f4W0/t1MECb8hQsXsHr1aowaNQoJCQnImDYNhWRz2phwrDKPnyCbjew3npjOQ27YfqPv5lL3UEPwEI4gAeBde/zz1tp2gJUkgjZnLkAGuZcu3Hmy2WbNnSvxuLi+fbFu3TrUkJfIectPgGeOEHl8BgN8JH1kbhyp0YbaNulNIHXHtWw82YifTiPFmjeSiTxRtgW5yoPfJ9sD+98IdhjKysqQnZ2NRLLfUsiDXrxsGcrPnvHfDLV1dNOQbUreqaj3nqROc1bK9zbcAKGEoCKcqDpShTwvl4O0lhZt4EpKhm/XLvJWDagi8ixfuxYDEuLFVlqwYAFOkido+VQ3PhGHycPEYwnDy3cDWXgbv8a1aExWJtJNkkte421MCtn/pu0BmIm4hYWFmJiejoEDB2JsWhq25OejooZuHiZ52TG4p8/0zyEmqW1LHg73nj3+mXGf8ZnBjOAiHF0AL5djswc5MAGWZi1hD4+CZ3Y2QEZ8HUma3MK9GDV+vFzcKVOmoKCg4NbhER3Ax1tTW4u83FwkJycjJjYWk6dORXHpYRgddnhpm2/TVjgGJPiHXkeSd0r2oufUqcAnhB6CinACkihs34gHyZUjLcPgHJII5OXDTOqtmNRXJqnVwaS+UlNTkZOTIyGJuwFW5ZcvX8aaNWswaNAg9Okbi5nz5kmhgYszCHSTeDJnwkZOEOdgbUkpcOflwXctdAcUBh/hCN7L5CFu2iL1aha6UPaOXeGbOgP2Q4dx8sQJ5GzYgOSxY9E/Ph7TSKIcKS0N7KkvuCbvNEmrJUuWoD85MXGDE7CIVP7FSrI5yd70rt8IF0k3Ng04/MKequf0ab89GaIISsKxgS7Th8iWs5IasjZtAU+cv7qikry/3B07MIqI1oPsuJEjR6Jo377AnvrCSM4Gp7Rmz56NgeSdDhszGmvIfqs6dw5ecn7co9Jg58cscdJ/xGhxiNhZEZswRBGUhGNwE7JWVEQe61jY2neC1q4TXMmpuL50OfZt2IQJM2YgIi4O8UlJkrNkb1FvXCF1mrdtGyYS+RNSh2Pc1Axs25qL6wW7JGjt6BIF60ekSvvHw7lytYzbD3UELeHYg+OKX248tg8ZBndYR7g6dIFxSBKOzMjCjPETEBXbF7GJiVhDRruBCxwDu+oBdhhOnTmDpStWIHn8OAwh6ZY1fTqKFi6CYXomNG6UadoS1vBuMvfXU36MVGnoP4EweAlH4DCJRjYSl5u7+w2Ck58GSCrqdEwcFsX0RVxkFOKGDBG7icuAnDqqKo78HSwvRwap035DhyKJ1jJyYsqHJcHSuy80Ok5u7LGPmwh3YZGk20IxDHIzgppwDH4Ah+doGbTZc+HibieSGhWNmmHj+40xskkzDImJweyFC1Fy/DgMDrtuUo5zErvIWRmRPhE9o6IwqnMXbOkcjgut28LRqi28JNlco/mpNPnw8BwTXeXv3UPQE46lAld3ePeXQMucBWf33qh5txGKnnsJ8198FRlh7bCQ1Ou+3btRXVvrb1jRAWZNw869hRhDEi2+UWNk/fUtFL/1D1TTsbk7RwBpE6RCRIbiqAeDBBuIdEQmT9F+aGQfmcOjcPal17H7iaexiS70tt6xOEpqt+b8eV3kCCtuQ10dilavxXzyomc+8zw2P/Ykzr7yV5hat4Nn5Bhgax58lbdO9ocyQoRwBLLPmHTe4mI4yWmoJSly7pU3UPbcyyhv2gIX6SKb8nfAx+rra7TluHLFRWSrKd6P8nETsIvU+q7Hn8Kxp59HDalSJx2HFBxUVIT08OjPQugQrgF0sT0HD8GaNRvVkd1x4c13cO7VN3GlVTuYUkZA4wGGtN177rw/aX9zUv5LQIYUGgyiHtmetG/agprx6bjQvjNOvPoGTr/8Oq5ynpQI6GHSc2HofSbZGhB6hOOkutkMW+kRVM3OxomIaJSSKjv+7IuoerexVAprPK5r+Qq4d++VADKXKn0pacP2Izst/LhKkmgaZw6yZsE8IB5VzVriDKn14yRlz3XogprJU+Hk+jzuNLsPJVsDQo9wATjsNlQePIj9EyZic9OPkEsq7egLr6K2eSs4OfbVbxAcY8ZJOomLHbX9B6CVHYPn5GnpefCevyA1biy1ZPHvgemWXO0rjyI/clQKL+W5+OmToSUOh6NnDKobN0P5X17G3udfwl76vvKx43G9sAieT1Wt3H8IWcKxwqqsqsL2Vaswq3cfZH7QCFuJeJe6RsJG9p09rAPs/JRo8mqtgxNhI6/RPjVTHu7rmLdQSORauRquNWtltD3/zgMLeQgiPxWQB904SGrxcEILjw/rGA5v50iJrZ3+sDk2vvEW5n/QGDn9BqBo1WpcI9Iq3MOEk1IkUo9fdPF+bJEx4arIrtqyfTtGJCcjPjwcc+L6oWxMGkypo+CM6Q9HeDRs/HARkngyCJDIZ+nWS3oKeCQYz6KzDRoM20Ba/eP9lca9YmHuTu/hxV36UbRfx65w0OeApKZ1WDIKe/XBlLB2SOwajinjxyG/YCeuBKYEMHjwzq2O/XaLzy3Ycc8Rjv+pXNbD1bBcvGg0Gv+5uBnldstkMsl+FnIGLpNTsD4/HwOSEtE1KhKjU1KwZ3kOasmod69YBS17LlwTJ8OanAoLkcsS3cM/SfyjNv5nmvJzsFqG0U9e/Fpr/2rdFmaSlJZYImViChyj06Bxn+yK1ahbtQbryWGI79YDUd2ikTphPDbu2C7VyFxSbrNa5Tjv5HxuPHc+J/6fcG9tMOOeIxyTjf/ZFRUVKC8vl24nboYpLi6W32+3SkpKcJBstyNHjqCY/p4zbx4ie/RAi3ZtkUCE27JtG6ouXICHB+FcugjvocNwbc2FY+Fi2NMnSaseP0qJ+0O5ZMgSSSsisPi1niT9yCmwjRorqpUHEXoL90ltm+/KVVSSbbdwwUJE9eqNFh3aI3bQQMyem40dO3agtLRUSqUOHDhwR+fD72lY3IHGbY/WIC9duucIxzVkly5dwp49e7B06VJMmzYN6enpmDRpklTwZmRkfO6aOnWqrKysLEynfbnwsWnz5ni/aVPJq67dlifl3X45QSrKYpbGZxlMuLcQbp5SnrPKPxduwSI459OaF1gL6bVlOXCtXS9PcuYOfG6uAaluKQz1eHGGnItZixejY7dueLtxI7QKC5OGnvHjxiErM1OOi4/vdufC2/mcG8570aJFcuNdv0E1ByPuOcJx/8GpU6ekS53/2dzlFBsbi7i4OLlwXDp+J4v3iyeyRUdHo1WrVmjfoQOGjxyJzXl5qOTn0P/THqKfJFXlgR4Wq7+xhptjqqqlTe8Tq+oq+PlYHGCWh4fwOFSOpwU+y0m/nzl/XppkYvv1Q0v63tatWyMyMlKOn4+JF98EtzrmG1f//v1ln4bz5hbDLVu2SAVxMOOeI5zNZsN5umisguaROuR/NBdRcosdD6i505WWliaLe0BTyGlgCcMSs4TUGUsJDxnhXzWYcJVEiIKdOzF75kyMou9OTkqSUvcxY8ZgHB0Dr4Zju9VxNyx+P59zw3nPmTMHu3btumv9GV8V7jnCcaFkXV2d9CGwPcZNMPlk+PNiEn7Rxb2p/JM7p46RTXjlyhWxg9hT/KqhkUHPTgubBKWHD2MvmQU7bziGL7J4nxvPm206vhE/3YEWXLjnCMdeKs/AZVIYSL2xNOJ1jVRZw+9fZHFfai0PvCFHhD+TZ+zKFKXA932V4NBFg4dtCXijfPPwMdzq2D5v8fk2LP6b/xd8/J/qsQ0y3HOEYzTE4JgY/A/+VxZ/xo0xrK87lnXz5/PffAz/6rncfB7BinuScAqhC0U4BV2hCKegKxThFHSFIpyCrlCEU9AVinAKukIRTkFXKMIp6ApFOAVdoQinoCsU4RR0hSKcgq5QhFPQFYpwCrpCEU5BVyjCKegKRTgFXaEIp6ArFOEUdIUinIKuUIRT0BWKcAq6QhFOQVcowinoCkU4BV2hCKegKxThFHSFIpyCrlCEU9AVinAKukIRTkFHAP8PZhnXObfRmVAAAAAASUVORK5CYII=)
The given image is a symbol for ______.
![](data:image/png;base64,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)
PhysicsGrade-7
Physics
The given image is a symbol for ______.
![](data:image/png;base64,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)
The given image is a symbol for ______.
![](data:image/png;base64,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)
PhysicsGrade-7
Biology
In animal behavior, the opposite of habituation is ___________________.
- In animal's behaviour opposite to habituation is observational learning.
In animal behavior, the opposite of habituation is ___________________.
BiologyGrade-7
- In animal's behaviour opposite to habituation is observational learning.
Biology
____________________ is monitoring another animal's behavior and then either copying or avoiding it.
- Monitoring other animal's behaviour and either copying or avoiding it is observational behaviour.
____________________ is monitoring another animal's behavior and then either copying or avoiding it.
BiologyGrade-7
- Monitoring other animal's behaviour and either copying or avoiding it is observational behaviour.
Biology
Swimming in dolphins and other aquatic animals is ____________ behavior.
- As swimming in dolphins and other aquatic animals is naturally from birth , the behaviour is called Innate behaviour.
Swimming in dolphins and other aquatic animals is ____________ behavior.
BiologyGrade-7
- As swimming in dolphins and other aquatic animals is naturally from birth , the behaviour is called Innate behaviour.