General
General
Easy
Question
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/1710242/1/31026/13.PNG)
A circle with a diameter of 10 is shown in the figure. If
what is the length of minor arc
?
Hint:
arc length=2![πrθ divided by 360](data:image/png;base64,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)
The correct answer is: ![fraction numerator 10 straight pi over denominator 3 end fraction](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACgAAAAjCAYAAADmOUiuAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAWRJREFUeNpjYMAP1IC4Fogv4FHDB8TTgPgkFM+EitEFLAbiNCD+j0fNXiD2Q+L7QMXoCnA5MBSIJ2ERnwDEkYPBgWuA2A2LuCNUDgYEocnkD9QsXJjqDnwHxGxYxEFiL5H4xkDcCsQsWMz6QcsQ/INHzy8izRowB/4YDA58iSOKOdCiGJ9Zf2idSTywiLuhZRJ8DvpPSwcGAfFsLOLzcRQzTFii9BuOWKCKA0FgPxAXQHMoyKJqID6IQ608EH9BEzsOra20yHUYobIKVMbNhYbMN2hVx4PDvCwg3oEm5gXV18UwCkbBKKC8KBlMeBSMglFALwDqf2yD1qeg+vgWtNMkPFgcuB/a7EJuMhlgaRQMOvBpMDtOCYhvDEaHiQNxIjQdeg3marJgsEYtqHUdwAAZRLIfzGmQB+rIQQ1+DGbH6UEzyqAAoC5mKLTbyQStWe4DcfxgcaAtEG+BRukPaM3iQy3DAcxEgwJsiSXZAAAAlXRFWHRNYXRoTUwAPG1hdGggeG1sbnM9Imh0dHA6Ly93d3cudzMub3JnLzE5OTgvTWF0aC9NYXRoTUwiPjxtZnJhYz48bXJvdz48bW4+MTA8L21uPjxtaSBtYXRodmFyaWFudD0ibm9ybWFsIj4mI3gzQzA7PC9taT48L21yb3c+PG1uPjM8L21uPjwvbWZyYWM+PC9tYXRoPjzHapkAAAAASUVORK5CYII=)
arc length=2![πrθ divided by 360](data:image/png;base64,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)
![2 asterisk times straight pi asterisk times 5 asterisk times 120 divided by 360](data:image/png;base64,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)
![10 straight pi divided by 3](data:image/png;base64,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)
Related Questions to study
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In the figure, circle A intersects circle B in exactly one point,
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![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/869058/1/31023/12.PNG)
In the figure, circle A intersects circle B in exactly one point,
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![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/869058/1/31023/12.PNG)
GeneralGeneral
General
In the figure,
are tangents to circle. What is the value of m?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOcAAACOCAYAAADKDx+yAAAZdUlEQVR4Ae1dj3NUVZae/6RZGrLAoiBZBjcCKfDHKIUxspJCWQxjAohTgDrBtfjhSJhVoCRBV3ALZgizM3FKZCvoiuPEqQkrKYlKdom7oTQzoPIjGYJGMAMGOulv6+vkhNcv3a/f636v+73uc6tS7/V798c53z3fPeee+9AfQIsioAj4EoEf+FIqFUoRUASg5FQjUAR8ioCS06cTo2IpAkpOtQFFwKcIKDl9OjHBFyuCS22N2FmzCJNC41A0ZxGqq6pRvWguiqaXY/2+D9ETiQZfTQ81UHJ6CK52DUTa61AcmobKg19imIoD6D6yAbNC87GppVchskBAyWkBjr7KFIEbOHdwFcKhCuw9de1mZz1NWBEah+K6dkRuPtU7EwJKThMg+tNNBC6hZeNchCc/h5YrQyMdR3Hj1D6UhUrxTHP3iDd1c8z86UvJmT9z6T9NBk6gviSM8KMHcS4W0w6i/8wfsbvqLiys/QO6dc9pOWdKTkt49GUmCAx1NaB8NBm0HA/NmYJwaCYq6o+jT3NBKaFVcqaESCukh0AE3U1rURSaj9rWvlgX0f6v8NEbz2Hh+NlY1XgK36fXccG0UnIWzFRnW9GLaK4pMe03KcM5HK66DeE7XsWng9mWKVjjKTmDNV/BkfZqK2qnjkPRyiZ0G0PY6yex+66JKKo8iLPG58HRLGuSKjmzBnUhDRTF1bYdKAlNQXnDZ5A8LSLdOF5fiUkznsCvOi9rpjaFSSg5UwCkrx0iMHQWLa+9iPWLZiIcCqP43kewoqoaK5beh+LxpVj2/AEcPfOdEtMGrEpOGyBpFUUgFwgoOXOBuo6pCNhAQMlpAyStogjkAgElZy5Q1zEVARsIKDltgKRV/IfA+fPn0dXVFfvzn3TuSKTkdAdH7cUBAteuXbMk1jfffIOTJ0/icFMTdmzfjo0bNmBeaSnCoXG2/liff2z/4YcfgkQOYlFyBnHWAiwziTJrJo9Zhom2vLISFy5cwPvvvx8jopGET6xeHXtGkvG9eEpehXAksvE5ycj6r+15LUZQGYdXIay09TuMSk6/z1Ceyff8z54fJaaROCQlvaSQ0E21SUaSloRdUlERG59X/vYzUZWcblqB9mWJAL3cnfPmjyEnvWc2CwnJRYCemQsEicrfDLf9VJScfpqNPJSFhDzyzjsoW7hwDCnFc5IYuSokKj2ohNO8p8x+KEpOP8xCnslA4ybhVq1cGSPkxPHjMf2WW/Hyrl2x/eW6tWtHibpyxQpfaE+vydBXwl4/kFTJ6QvTCL4QQkgJFZn0ISH/YdasWILGHDKy/pbnn4/tM/2mvZGkTC6ZZc+WvErObCGdh+OItxFCzi4pwbYXXwS9IUNWeh8rw+ZxCev5JYw0TxGJyXCX3pSyZrsoObONeMDHE0Iys0pi0XhJwhdfeAE/ffrp2DOSlccbdgrb53LPmUpGLhyiK69Wi02qvpy+V3I6RawA6ycjpHgTGrDsI+ltnBQSm2T2e6Gu4kXtLjyZ6qTkzBTBPG2fipCiNg1VjLa87AHH54Zs7+fQVvTklZjwQwbKmw1vr+Q0ol/g92ZC0ggZyjFBwnfmwudSh+9/8+tfx/7M9VL95p6ObYNSGB1Qb3p9L4uS00t0A9C3U0KKSjRMGqiRVDwzJNGcFvaRTjun47hZnwsTIwaG5IkWLjfGUnK6gWIA+6BxSaJDvF8yD2lWT4jJ+uZCg3X6SRz3rJTBaTvz2Nn+TXm9JKiSM9szmsPxmNQgsWhQTgkpYlsRk3X43uhNpV2qa9Vjj2HnSztTVfPdey8JquT03XS7K5AbhBSJUhGT9Tie3RCVHpOJFYaGM4uL8cPiYhkqUFevCKrkDJQZ2BPWTULKiHaIKXWtQlsaMj0rCcl67JfySmjL+yAWLwiq5AyiJSSQ2UxIGj+9Eo0+08K9JcPgRHvMRH2bQ1shJD2qkZDmttwD8y+oRQhK/d0oSk43UMxRH14SUlSSc0gn+0jKxX8GJllYK0LKOLzKIuBV9tM4llf31J0LmdOPMRLJo+RMhIqPn5EsXJlp8DQCNz2kWW2ShOOk481+snp1jJyU126R8ex6aLv9ZrseIxbOjRPdE8mo5EyEis+eGcNCrwlpVJ1fwzAUzaYn48LDcYNeuKBxYcsEOyWnT60gV4QUOOQrGMqRzSJhoRt75WzKbR5LooB0og7pS8kpSPjgmmtCCgSSOXVj3yR9OrnS42Tj21UnMqVTV/br6YbpSs50UHexjZmQDCOZSMm2xzKqxLCSe9lcFUkk5Wp8N8elLumGt0pON2fCZl9+JKSILhnTTJMZ0l86V+LDvXUuF6h05E7URsLbdI5XlJyJEPXgGUNF8Qg0PD94SLOaNCTKlY4hmfvK9Lfgk2k/fmgvC57TxUbJ6eHskZDyeZpfCWlUX5JAfkjGUBYSNF8KdXGahVZyujz7QSOkqC/hV66SQCKHXIkjFzRmb/OhSHLIyXZByenCzAeVkEbVScp0ExfGfty8Z1LKDyG2WzrRczo5WlFypom8mZA0bBqSk5UxzaE9aeaXvaZROe7ViGu+FNl70nbsFCWnHZRG6iQjZNBDL6dG4wCyjKoy1GZoS/nypThZBJWcKWY9XwlpVNtpuGVs6/U9w0AnoaDX8mTaPxOEdrcPSs4EaHPF5mpNo+DKLSFr0D1kAlV9/+8oxatzTvKhOIkGlJwjM15IhDQauazkxmd+u+fimA+f8wmudqOBgiZnoRJSjITXIGREmWjL5eeERrzcuLcbDRQcOc2EZNjKlSyfkg52DYj76SCcJcoZod0sp139c1XPbmhbEOS0IiTfFWqRFTwI+jPL6ZcPJNzAi0m4VGe4eUtOJWRqE6JxOP2kLHWv3tSQ75K96T37vdr5PDHvyMmMKo2OSQRjyFrIHjKZ6QXJG73f3BybT6cfjyfTPdfP7YTqeUFOJaRzU+NixcXL7180UU5ZbB9esiRlKOgcidy1SLXfDyw5lZCZGZWs3Jn14m1rEpNZWibseB+EYx8niFA3q310oMhpJiSV44Rx4myX6GV0Nj6DisWVWLbgQaxr/F/0R223zpuKdvY8uVaW82tMmgQlu2wXt1R7ft+TMxkh002rD515HdWb/4g+EjLyFd59Zj0azwzYxTNv6jHB4udkEOUjOc3FTpbT3Mavv7lAJtJR5E1Jzkh7HYpDt2FF0zlp4/nVTMjpt9wa85DpEvKmwBH0NNUYdDH/vlkz3+9o5FYh1aj+kfM4tvtJLJweRjg0BfPWvI7O/sHR1+ndDKK/83U8uXgJqpeWYaGpTyZ9mNBLNN9y/OMoWsIAejvexp6Nq7Bs5QZs37kFaxfMx4KqzdjT8hVupKdExq1SbS1SkPMK2uvKEQ6FMffVDmQ6JVbacEIkXc6NsoSsnCAaklsfCcR5zuhFtGx+piA9J/FNTc5rON1Ygx9vP4RjJ46jee86lIbCKNnWhqtWk5nq3dCf0PjYC2jpo0UNoPvIz1Dd+CcMjbTjHjOZbCQl7cO2PUQuon3fasyc8QR+1XkZsoOJfnccO+ZPRHFdOyKp5PXofUbkjHY34YnH1+CJW8dh2pbWzCYkgYJWhDRW50TEu/8oIj1tOFBzP4omPIvmvkFE+ztxaFMFikNTsbDuY/RjEP2fv42ti2ciPH4x6k/0DXc5uudcjurFD+PJAt1zpsoUGvEfvY/+GY0VUzGpphkjaI6+cnTT04QVVU3okUaG30I+K8/IvRoJnLJEv0XH7qUoGr8Uezq+HSXmcLsr+GhbGSoPfml6nrJX1yqIrsky5haek15zHeo/bsOBsikIG8FMIR4HTTagXUKah4gLc6Ld+Oitd3F42yKEyxrQeb4Fu2p/iZYzHTj46G2YXdeKL4/+AjsajqP7899gSWg+alszMiezOIH/TXImm6Okyl0/id13V2BH26XMDDrOcw6ir+WFUc/JLU2qvTDrUP5PPvnEIhkYxfedv0DF+Im4q+4EHKQMk6rvxQureUhKzpjXXN2E7ug5HK66DeE7XsWnNuLa/fv3x4DjoLNmzoz95w3NhOThN0PYRHuKZACM/f71Elo2lqLk6Rfxr3uOojsSBfqasX5CKX6y5SXsaTmPCCLoPVKDSZOfQ8sVCZqSjVBYz62MYiwSUUR6/wdvblqMe2r/aziZFqs0gJ62A1h/r3jTQfSfOoTNiwzRSvQKut76OSqmh1G04BW093MeDHvOx5agYu3NfSzD2WQhrcjFRWXC34wftbMj77wjrwzXb9C65R6EQ0txoOt7w3N/3VrNQxJyjnjN9isA6P7vQdiGgZOEHCzRnxCSddIpYyZt4ATqSyZi1vojw8REFFdbt2JaaC7WNZ0Z3kdEL+DdNSWZ75HSEdjnbayMYozovUewdrzM62ysOvBp7Pgp2vMx3v79IWxfcBvKG07iQstr2Lq3BWdO/RaVoftR39aJo3vqcaDtDLoaf4zw1K1ovSq7vjGjxB6MmecE1bjom21sjF0NdmD3HWGES+rRPmA9ZoIhsvbIah4SkDOKG6dfR1XMa1LGazi1twLh0Boc7rHeOhNYM2hWgztBwDxpQ10NKB/Zbw738x3a6+7HLRtbwCWFJdp7BOsm3Iftbd+OPNGLIOB4XiKX0NX6xvAePlSBvadGAsUrLdg0+S78dNuukWhlEH3Nz2LS369C7c5foqV7AIgtkrfHzY3IYb6a59n8nr9t2Rj3sXQUDrZjicby+pnVPIwlJzOYm8qxYGkVVlRVY0VVFZbdW4xw6D7Ut/dbyspwIxFwfCZhqdVG36rz+EmLoLtpLYoqGvGFLIqDndh79+1Y1XR2ZD80EtJytb7cg/a3j+GLG1LZaqTCeGdlFMkRiOLGqX0oGz1ai2KgvR6zQ/PxzJGvRrKefWjdMh/hGTU4fHY4nHSySMbPc2JJ+L+oN9vZGM8p3j5/yBnFjc//HVX//Hv0jtrxEK60PIdbQnOxqeVSYrQMT195+eU44Jhp5Qae5BRA0yFq/HHKRTTXzI473ol50rj9xffoangURaGZeGjjr/FRT+F9aGCYljG36ZETiJ47iMpRz0mMl8Znb2PbjVKDrYwskrfvwEcpQloKaSchRJsSW+KVNjemDH02nMicvAHN35iTJYPo//IM/sI8RY6L1TzEe87Iabz5+FNoPB2f2xr+EGGa7bQzVzF6UXPCh16TwDolqqSc47xu9CouX75ugDaKyNcX8bUPADcI5dtbK6MQoaP9n+F3h46P7On5RdVf0Fa/HGVbjw4v3tGzOLxyNpY0/nk0ezt4ai9+NH4tDnePbIFGQtppW47hcu9/4z+PnrE89Je5NtuOyMSr1Dn4xhsW/z+VCHpbtmIej9a2HMGZkQ8nov2ncbRhI1Zt/cNNvYydZ/neah7iyNm4ZgGKZizF5jc6MBzADqG/4z9QV7MIk0LjUHTvGmw/KO8y04IA2yUqQx0SWot7CFgZhYwyvCiPQ9GcRaiuWo6H7n0Emw60oUcWwFh2vBy7O+SThGFPyuOtLkmOD36GAw9MRXh6RXxbGSTBleeYxm9qzVVoNzxai1uszZVivwfQfezfsG6BhMFTULp0Cw4cPe2L76llkUl2pBVHzoT6ZeFhIqJychji8B0nIpkCWRAvL4ew94VQatWjf72My0LWWPUBfN3Tl9FXN/SanHOSMFHhFseKvIna+PGZ5GiSLTK+IKcRODNRZ0ybjmVL/ylv/p8ZRl1zeU8DZ0Ti18KFmQTl1VhIXHp983NjnaDcCzmTyes7choFFaK+8PN/iU0IJ0s8qrGe3jtHgDim+hLHea/utpDw1biI5NO/6aRePP9PVnxNTqPQQlQaFFdOJaoRHef3NIz475Wd95GNFkwuUk4aMcm6auXK2Ndl2Rjb6zFS/bO9wJDTCBRDG66gnDQlqhEZ+/epQir7PWWnJom5vLIyNt9jzjSzI4Lro6TaWgSSnEaUlKhGNOzfy94tSIk2+SeF9rX0d006lmRJL0oeeHIa4U9G1HxZaY26unHPUJERSFCKfJ8dFHmt5KRNkpy02WQlr8hpVNJMVJlYJepNlHh2HJTzYwnDrYz5pmb+v7OT2MpbchqnR4lqROPmvR0DuVk7t3fMLgchgWUXJS6Kqc5qC4KcRsCEqPSkDCsK2aMSC2IQhH0ns/NBCsGNNpfoPtV+k20KjpxGoBjiSpKhUIlKb0QM/Fz4wQHnJ19CWtEn2ZdBMhcFTU4BgddCJaosTkYs/HbP8C8oe2M72NkN0ZWcCdBMRFQe2ufLym1UWUJbv34OR+9iJwQ06uTneyf6KDlTzKSZqAwDuffJJ6JSp1TJiRQwefaa54AkZ6oQ0DMBXO7YiT5KTgfg5ytRxWD8uODYyWo6mMKcV2UC0u5CqORMc7qEqMwicmUPskelV6Iexg/M04TF1WZ+D7mdKitntbQdO0XJaQelFHW4X+NqGGSikpiU30/hY5DOYVOYSOw1v6V18i+BlJx2UHVQJ6hE9aP39PNe2IFJxKqK13RypqzkdIqyg/qJiMr9nZ+8k1EdP3lPCWmdGLNRF7/dO/WalF/JmaVZNBOViQ6/EVW8px8+SgjC+atd0+HcMy/hdKFRctpF2MV6fiYq93k0JLtJCxdhietKPquMexjAH1zwqEs6H1EoOXM84UJUEoJ/fvCo3Os5SVy4DSEXBj8sEG7oJVuFdI6plJxuzIALfXCFZZhLcuaaqJK8yNWH5gxpuUAEvcgik+4RlZLThxbgB6KSIDxayUV4y3FztTC4ZQ6cQy4wmSwySk63ZsOjfpIRleGw10WMizJkq0jyJJ0wMFsy2hlHzr0z0UPJaQdpn9QxE5UehkbgFVHpNWWMbEFAfXK533VDT/kcktdMipIzE/Ry2DZbRHXL0OxARZ24GGRq1HbG8qqOmwuaktOrWcpiv14TlftPJqmceGjWZXKLe0e7oZ0sBNQniIV6cnHJZJ9p1FvJaUQjD+5pICQEDYSEkrDUCbESwSB7KLsJIhKTbXgVgyXJrQ7iWZd/QSxcUNzeoys5g2gJNmV2m6g0PhLNDkFZz+gxuTiQnDyQ5zuSkJ5SvCSvXEyCGNIKMc0625ympNWUnEmhya8XyYhq5cnMCBiN0IqgfEcSJisiCwlKQpL0tbW1KJ0zJ1kT3z63i0k6Cig500Et4G2EHBL6yqdyVoQTlY3GmIzYPHRnSGunsD961bvvvBObN26y08Q3dYiXk2jCqeBKTqeI5Vn9dIhKQpF8ycJQHoU4CU8pA/vKdF+czakhMRnGkpzEw4ui5PQC1YD26ZSoQlCzlyTRnBgsE1hWYbDf4JSsMhchJ3o61UPJ6RSxAqlPzyAJHJItWegrhkoPQnIz1OW9kyJ9O2mTi7rGiMG8IHkhj5LTC1TzrM9UROV7Eoxh3q5duxz9R6rZluTn1c/FqKOTkD0TnZScmaBXgG1ppIk86oULF2LPSbSnn3oq7hjFCibpy6pOLt/RW1JG6sUwltFBtoqSM1tI5+E4ZqLy/zpNI37wgQdiXpRZ21R7Mnpcv/4LFHpIiQhyIaOSMw9JkwuVSNSG/ftROnt2jKBlCxfih8XF+McHH0yauWV2lmTOpjeygw33zfSSlI17y1zJp+S0M1taxxEC4lFJTBo4/3iO+d5778U8KUn58JIl+Lu/nRTzsKm8q6PBM6hMuYSUvCY7x81gCEdNlZyO4NLKThGgwe986SVMv+XWGEknTywaJawQl+9zVbgwyFEO5fEDKQULJacgoVfPEfjggw/AcFdIabx6PrhhABKS+0n5fJBZ5lyGrwbR4m6VnHFw6A+vEaCXMpJS7nk2yqwoPa0XYS5DVCaoJGzluOaP773W3Wn/Sk6niGn9jBAg8WbNnBlH0FdeeSVGTBJUyMosKYlEQtHLkVyp9oDc67IOCc52JJ+5T3pIrxaAjIBJ0FjJmQAUfeQtAiQoycM/EsVY+E68HIlEgjLsFNLavbIdySlj5CrjatTN6b2S0yliWj9nCAhxxYuar0EkoBWYSk4rdPSdIpBDBJScOQRfh1YErBBQclqho+8UgRwioOTMIfgFMXR/B96s24BlM8IIj5+Lhx6rRvWiuZg051Fs2v07dPUPFgQM6Sip5EwHNW3jDIGBNmy/dRyKVjahO8qmUUR6P8a+lbNRtGA7jvVGnPVXILWVnAUy0blUc6irAeWhKShv+AxDo4JEcePUPpSFJuKeV0/i+uhzvREElJyChF49QiCC7qa1KArdj/r27+LHiLSjfvo4hMsa0HWTtfF1CviXkrOAJz87ql9Cy8a5CE9+Di1XTAwUck6vQ7tGtmOmQ8k5BhJ94CoCAydQXxJGuKIRX8T2m4be+5qxfsK4xO8M1Qr1VslZqDOfJb2H95sT8aO9nYjPy0ZxvWM37gmFUbKtDVezJE+QhlFyBmm2AifrdZw9+DiKQvNR29pnkv4K2uvKEQ6Vo779iumd/iQCSk61Aw8RuIjmmhKEJzyL5j6j3xxE///tR+WEiZhX+wH6zOGuhxIFqWslZ5BmK2iyXm1F7VTTnjL6Hb5o2Y0VM6Zi3prX0akfISSdVSVnUmj0RfoIDKG/4xB21CxGcWgciuYsQnVVNVZUPYIF06eidOlG7HnrJHoj6jKtMFZyWqGj79JEIIrI5cv4q3IvTfyGmyk5M4JPGysC3iGg5PQOW+1ZEcgIASVnRvBpY0XAOwSUnN5hqz0rAhkhoOTMCD5trAh4h4CS0ztstWdFICME/h8laeipZSSZ2gAAAABJRU5ErkJggg==)
In the figure,
are tangents to circle. What is the value of m?
![](data:image/png;base64,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)
GeneralGeneral
General
Point B lies 10 units from point A, which is the center of the circle of radius 6. If a tangent line is drawn from B to the circle, what is the distance from B to the point of tangency?
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/1713768/1/31017/10.PNG)
Point B lies 10 units from point A, which is the center of the circle of radius 6. If a tangent line is drawn from B to the circle, what is the distance from B to the point of tangency?
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/1713768/1/31017/10.PNG)
GeneralGeneral
General
What is the area, in square centimeters, of a circle with a circumference of 16π centimeters?
What is the area, in square centimeters, of a circle with a circumference of 16π centimeters?
GeneralGeneral
General
Two circles, A and B, lie in the same plane. If the center of circle B lies on circle A, then in how many points could circle A and circle B intersect?
I. 0 II. 1 III. 2
Two circles, A and B, lie in the same plane. If the center of circle B lies on circle A, then in how many points could circle A and circle B intersect?
I. 0 II. 1 III. 2
GeneralGeneral
General
A circle is inscribed in a square, as shown . If the diagonal of the square is 36 units, what is the diameter of the circle?
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/1710295/1/31011/6.PNG)
A circle is inscribed in a square, as shown . If the diagonal of the square is 36 units, what is the diameter of the circle?
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/1710295/1/31011/6.PNG)
GeneralGeneral
General
In the figure, two congruent circles are inscribed in a rectangle. If the area of one circle is 9
, what is the area of the rectangle?
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/1714409/1/31009/4.PNG)
In the figure, two congruent circles are inscribed in a rectangle. If the area of one circle is 9
, what is the area of the rectangle?
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/1714409/1/31009/4.PNG)
GeneralGeneral
General
In square ABCD, if the radius of the circle is 4, what is the area of the shaded region?
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/1711456/1/31008/3.PNG)
In square ABCD, if the radius of the circle is 4, what is the area of the shaded region?
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/1711456/1/31008/3.PNG)
GeneralGeneral
General
If 4 congruent circles of radius 1 are tangent to the sides of a square as shown in the figure, what is the area of the shaded region?
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/1721690/1/31006/1.PNG)
If 4 congruent circles of radius 1 are tangent to the sides of a square as shown in the figure, what is the area of the shaded region?
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/1721690/1/31006/1.PNG)
GeneralGeneral
General
10 mL of 1 mM surfactant solution forms a monolayer covering 0.24 cm2 on a polar substrate. If the polar head is approximated as a cube, what is its edge length?
10 mL of 1 mM surfactant solution forms a monolayer covering 0.24 cm2 on a polar substrate. If the polar head is approximated as a cube, what is its edge length?
GeneralGeneral
Mathematics
MathematicsGeneral
General
Explain how you can use your graphing calculator to show that the rational expressions
and
are equivalent under a given domain. What is true about the graph
at x = 0and Why?
Explain how you can use your graphing calculator to show that the rational expressions
and
are equivalent under a given domain. What is true about the graph
at x = 0and Why?
GeneralGeneral
General
Direction : Identify the root word’s meaning in Greek or Latin for the following word:
Autograph, Biography.
Direction : Identify the root word’s meaning in Greek or Latin for the following word:
Autograph, Biography.
GeneralGeneral
General
Direction : Identify the root word’s meaning in Greek or Latin for the following word:
Folio, Foliage
Direction : Identify the root word’s meaning in Greek or Latin for the following word:
Folio, Foliage
GeneralGeneral
General
Direction : Complete the following sentences by choosing suitable words:
The ____________ had a small birthday party celebration.
Direction : Complete the following sentences by choosing suitable words:
The ____________ had a small birthday party celebration.
GeneralGeneral