OpenStudy (anonymous):
WILL MEDAL + FAN!!!! data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAmUAAAC8CAIAAAC2Q06+AAAYJElEQVR4nO3dXZMc1XnA8bnQB5GMMVwBF+0qV9BFvkGqoEiZKlDi6htXTGKoJJU7Kgrlyy5XbBBCRTBIhRVcComNB0kYgqSVFWxiEUC8ZIgBCZAQaHfRaqUVq905uZi3c06fc57TPW/dvf9fTZW0s92nz3Penu6e2ZmWAgAAkta8KwAAQA2QLwEAkJEvAQCQkS8BAJCRLwEAkJEvAQCQkS8BAJCRLwEAkJEvAQCQkS8BAJCRLwEAkI2XLztZ0kqyzti1mFQ5RQuf6nFRQukemUhX+gqZ4Dhpp62etF1m9y0yYue1IFRcfWvuM2ZE8btPqOk8+bKTJS1buQleLc0bcE71DbOa+XJi2umY82iyNWzqNA/bgrOjsqaXL61fTT9fNqtjepoal6W+YTY7X3ayZMx8NPl8Wc9xMo76Rl3fmvs0PF/2ns/S/pmouZlxtjp42jyFjYhteMPKt3k7HT2vn68P/++tZK4uw18Zu1hn2dZJuDuEAmEOK2aHOzimXRl9hdWOMzyIXWxMXcRyhEuNAn3titqi97leY0fjhI8S2DFfjfxI87WAd5xo4Yjj1nM8qTfz7e7to6io86V5FhFnFxcfOd7t0zQZPj3cqL9JxMIS0eCefbXCvVPFWXjcEQ3uXVxtErNv0d53tEXE+uOPtPB8NI/l7YuCEfmWCytUY5Mxm26gRL7UytQ2a6dWyzoO3MkSd4Ws9Wg0q5y1HyXMXpy9jUbn7v5Kek86rF20NGzcQYs7SQmGmRuW5srWyW1mz+7c6UG+WKmeceX47x0W6+t89QKlWSPK0QiBowR3DIyK4UjztYBnnJiFi+M2v1lcb+YCFgeqN+pQfQyeLi46ckLb63PY7jlxYYlr8Ih9zcbIHd0cGxFdbJeY38XTJjH7Fu19V4Rx648j0uLzMXcsd18Ui8i3XAQbcOymGyj4+mUo30SccY1ymie2qHKGpbTTVtpup9oPZmkq92Nk/cXnxwzTXdoggjErKdZzzGCLNsJEKqN1r3CUoq1aqDITGP8Fh+KYzSWXFjHNix690PPO/4utEdPgRfcNj9jILhZ3GWeWTWCyFF9/whs7DhE93UpEFL8gh7cs2nQDpe7Huo8aPiUOXvBqxepb+4Zn/2j90Hr/aHdpJ5wvrXtLoUrFh+nYYxixowudjaw/XzRfRpQjLiuRjVCoMkbLuxpHPEpsq7pGWtF8qY26mHGbG4pxvekroVTUodKM54OrYbjO3mXBtb2cL92DTW7wUBTBseQpPKqLxUr62iR23yK9Hwo8tJfn0L5DRMz6qL6IHM9xC3KBfBnRdAMTzJfOw5hX4ZGtFq5D71dJlg3OBNppK82yxOi+CebLmNOZUmGWGUNxjV9+zS175htohPKV8d2NDx6l0BiLbIFCTRQ5hwtPJXGvglEHfjvm9C/0vJwvpdxUPoqIaVu0i8VKxi4pRfb1n1WEqh2z1/jzMRzmmON5MvkyoukGJpQv414q6GTS65ft1NzaN5L0Fy7tn4ItZb5eIA9i4xedLIk5cZPD1MMwauN8pcQ863W/GmTVKvx3C3Hl+Nu/WF8LK4K3hSMax32UmB3dI61YvtSaMXLcens23Ju+EopHHS5NU/z1S+/0EbYP50tfTeIaXBiovrHkLNx7ROsgxuFdu3jaJGbfor1viVx/PJGWno/OZnK/lixHFLcgOwsYp+kGJvT65bCC+Yta7dkkTaWzBqOMQMXNIGObxogsyb0/1p9itfp7uqdYmM79zHdPuFtB+50xauxijTAd1Y0oJ7jUFuhr+Qza28Lu0RBxFE+r6tVwlR2VL51dEzdu7TrE9qa3hMJR50uzuZo57v2x7lpJ20v50lOTIguFta9euHvaOgv3HDF0auqrpKtNYvYt2vuWyPXHX1Lp+ejY3XE9EhlR3ILsW+rLNd0An4dXRCcb9+/nYo8STjCYE7oGJu/Lj2gi8qVAvz4P3+Wc5CGZg9VE18BAutxayJcC45bVbKYGi3Jl0TXAFka+BABARr4EAEBGvgQAQEa+BABARr4EAEA2q3zpfGPhVN9tyFsZfS0w8ZaJLLD0cSdS4Zm1xgyqUdmxPWbFyjXODFpjSoeoSD9WpBq6ClZJKUW+rG754yNfTryQKManheiSrFO3WAqaUr6c6kEndYgS1ZhXPxb5JK/58H0C1LyRL6ta/vjIlxMvZPyD1jeWGORL8uVE1Cxf6h9boX+qTf5jW10fuud43o7fONfONYi/hfRzd6M857POTwjUquoqzeIu3Pe0VFVnTcLhextT++7ymBbwFO/9KEvnBzUUO1CuGVpSj5TsylyDOBrf2MbV+vYGxcaJmy9fBqoRc7hAVZ0danzWtf/zwe39c10gfz19sIHEVaVc4zjXFntb/1CJaVh5ypRaEEKt6ulHcVmWx2quqrGd6/lsM1eTxq63vsw9et7VsKXn49h815ejntG//EP//FS9j+zxnH/eaIj8NAh9fPqIPWod24yK1zYWquQvzVu4vXtsVT2N5g3fX/Pg6A1/0LlVkG/SGTk+tqktRjlij0SUH9Ugzsa3trHW6I69wTjjxIzBdRoiVEM6nFmI1sjeDh2WWugD3MwucFXb38Uu0qpSrnGca0upuRMxBrwtXGZB8Laq7ygxDRgxVh1Zyt+54oKXa9IC662cL/3bhGOcDl++HHZBO22l7Xaq/TD8vd54bc93c1vPe79IxP1fR6Vi7ooE5ligqhH084UC08P3pNmc2vTwtERczfMt4KtbzGANiD+QUH479rvaIxskpvHzZY7ZGk7ufFmkGjHFiiEMf0g8F+qhk6/odc3YzFl4wVUlsnGktWUQbOTcKTVIipYceTh7s6LLcsEww9UIzdPA7Au2/Lj5cta8r1/2e6YfbO8f7dy0d05h0E7SA8/rkTobJdgcevG5EyRzfppnnY4qeUsLHNN58hldVX9N/APF15jWoYMt4KjZsBzr1ovz+XEOZN1hEnqkZFfmKuBp/EJrsXneIo8TX2sVzJcxhwsV4upQX2X8lRa62HfEmEkhrCrFG8e7tkTOHat+rjEQ08IlF4Ri/Sg0YORYLZAvffM0XJp7rzKz0tWw5efj2Pzv9+lkSZJlgzOKdtpKsywxlrXgNYHj+Vba7mSJ9+5N7/ww9jtAzDNZc7zkF1mpRO9Y9xQe2sVfeLAmvVFvbBJqTGtWB1sgVJ+Y88qxDxTbDmW7MtAX8cHGnMYWPbctlS/lwzkKEa+zO1nSSlPxbmxcFxdqNKvmwqpSvHG8a0vBoRJTgUC8JReEgq0absDISAvky4i12DcaJ9UC8YFMX+D9sfodcvsnZb/m1nG+RDd63kxvrrvtw1s4/vgjvnO8P3fMwt1VivmKdl/h+VJjqupvNC18+8Qy2JjBSspBGQHJr18WPVB+wQ63Q+muzA0kcZxIS6HWMr5xYo4GtxL5svCw1Ovh7dDBIiYtMJFdbA4hZxd7BFeVco3jXFsih0oofK0xI6ZMmQUh2KqBo3gbMGbwONvGs56E1ivl2b3Yemts206dtwHsBig/H8cW+nsScTTor1HYqdR6Phf/4GJKb2hxunkOqD3t+4Jv156+6nuPqX0D+7C6vhTvLdx/VHf4UmPGtoB5HHNRcEVhHNfsutgDmTtYX4bubodyXWlXwFV2VL50do2nx6aUL2OGpbeqytmhRk2LTDJvF+ens6uLvcX7VpVyjeNcW+xQ/HMnpmHjpkzhBSHUqsGJ6V2W49Y0q6rB82+5RFeTFlhvtafTLHAVNGyKMebj2Cr1eXiDk2Bg9qRLLzQfYwBBVcqXsS9dAlPAWgnGAIKqky8ZqpgrBiAYAwiqTr4EAKC6yJcAAMjIlwAAyMiXAADIyJcAAMjIlwAAyMiXAADIyJcAAMjIlwAAyMiXAADIyJcAAMjIlwAAyMiXAADIyJcAAMjIlwAAyMiXAADIyJcAAMjIlwAAyMiXAADIyJcAAMjIl5i+Tpa0Wq1WknXinq+4mlYbwHjIlxis/620Hfy5fH4gXwKoP/Il7AQwSJfWz2OkB/IlgPojX0INM0DvgrKdtlp6wuz9rGWHYUI1rkIDvzISzKD4tK09b1/SjrZzZSXzKL297OccR29nibvAUcTaISMK7DjrozeIs2QAtUS+hFJGTmynrVYrSdPETET9LGDmin466P3O/ytfXtT3sNOjUXS+qqNftNP8RkZVrMRn5SxHpnZwFej4wRW1UDKAuiBfQimlJcxOlmiZLW2H0qWRHyJ+1UvCo03ExJO/HgveC7Wu5nLZ2h+45/dygYGogyUDqB3yJXp6q3uaZYm+3CdZZiSuXAJp5dND/le+Kzwr2YxyjT/FSZed5j3liHzpve8aV2Ag6sAdXQA1RL5ET29xT5KkZaSI3hO+DJcvIPh6Yz8bi1ermXFNG3UUK48WyJe5MnqbRhYYVziXmkADkC/RN7oast8n63qvzyiXdbLEfJ0w/ystqRgbBd8440ktuaP0Xr90v8W3WL4M3F72FxhoEE/JAOqJfImBwUWQfTGZW+Vz9xl97xR1XoQNNhm9+0fPLlFXYq73x5q5NonOl+6XKO2jhAt0R+0vGUAdkS9RKbypFEBFkS9RJaRLAFVFvkR1aLdq510VALCQLwEAkJEvAQCQkS8BAJCRLwEAkJEvAQCQkS8BAJCRLwEAkJEvAQCQkS8BAJCRLwEAkJEvAQCQkS8BAJCRLwEAkJEvAQCQkS8BAJCRLwEAkJEvAQCQkS8BAJCRLwEAkJEvZ23nzp3bgQrYuXPnvGcDUCfky1nbvn37tm3b5r1UIta2bdsa2V+9oOY9G4A6IV/OWm+1mnctEKup/dXUuIDpIV/OGutUvTS1v5oaFzA95MtZY52ql6b2V1PjAqanivmy21VXrq1fWLp6fnF15dp6t9udd40moxfXjltv33HL7VeurTclrMba3OwurVzffusd22+9Y2nl+uZmQzqsqeOwF9f5xasXlq42KS5UR+XyZber/veT5Yf2LiQ/eO6O7x984NHjZz5ebEDK7HbVe+eWHtyzcPOuJ2++b99Djy+8e7YJcTXV5mb39+9fvOeRwzfteuamXc/8+SOHf/fe5w1ImU0dh8O47vj+weQHzzUmLlRK5fLl6tr6Pzx56qa/2L/j/md23P/MN3bt/5vHTqxcW593vcZ15dr6g3sWhnHdtGv/D/c0Ia6mWlq5fs8jh3ud1Xvc/U8vLq6szbte42rqOGxqXKiUyuXLi8vX/vRvn9fXqW/e+9iOW26b6nvrZ2DHLbd9897H9LjufPDQxeVr825vuH16afVb3zug99e3vnfg0y9X512vcV1cvnrng4eYX0AJlcuXnzvm854dt9w+7/k4rh233HbTd435/Cc/PHRh6eq82xtun35p58ub//LA2S9W5l2vcTG/gNIqly9Xrq0/8Ojxb+wa3Y/9q58cu3z163nXa1xNjaupFlfW7tr9or7+/tnDv750ufb3Y5s6DpsaFyqlcvmy2+2e+XjxgUeP9163/+vHjr/14aXN+r9uP4zr5vufvPm+fY2Jq6k2N7uvvff5Xbtf7L3f565/fHHh7c82mvB+n2aOw6auG6iUyuVLpVS32125tn5+cfXC0tVm/T1Jd2XwPv4mxdVUm5vdxZW13t+TLK6sNSBZ9jR1HDZ13UB1VDFfNlvv5ZZ51wKxmtpfTY0LmB7y5ayxTtVLU/urqXEB00O+nDXWqXppan81NS5gesiXs7ad7/OqFb7PC0AP+XLW+L5oVATfFw0UQr4EAEBGvgQAQEa+BABAVtF8udHd+Or64lfXFze6N+Zdl0kirnohrnppalyoiDnny65S111fufPOpdN/f+z+vzt231tfvD7zSk0RcdULcdVLOK7r66opn9GE+Zhnvryypk5/qF55yzGInz7z43t+9Z17fvWdn73943lUbVqIq16Iq14CcXW76tW31esfqK9WFUkT5cwnX66uqTc+UodOqX1H1eNH1Afn7Q1+enr33b/89t2//PZPT++eRwWnhbjqhbjqJRDXhxfV3iPqiaPqF79Vp/+oVvhmTBQ303zZ7aqVa+qts+rQKbXncP/x+BF15LRaM+/KbsH5XGvEVS9bLa71DfXym+rxI6Nl5xe/VW9+pC5f5Q4tCphRvtzYVEurqvOZ+vfX1N6j/SG796h69rg6+oY696U9arfafK474qqXrRZXt6vOfaleekM9e0I9MVx/jqhDp9S7n6ilK+rGxryqjDqZer7sdtXyqvqfj9Tzr6l/eXl0fnfgmDr+jjr3pVpzfaXrVpvPdUdc9bI141pbV59cUgvvqmePjxaiJ3+j/u2/1Ok/qsUrim8AQ9jU8+WbH6lnT6h9L40GaO/xxFH11Ctq/6vqwDHH46HD/XH/0OHdzg1q+iCuej2Iq14PMa79r6qnXhldYg4f+15SB46p1z+Y9nKIept6vrTGZeTjgRf64/6BF3aXK6GaD+Kq14O46vUYPy4gYOr58uCC2nuk8KhlPtfrQVz1ehBX/vH4EXVwYdrLIept6vny82V16n313EnjzWl7Dqufn1DHz6gz59T7nzoePzrZH/c/OrnbuUFNH8RVrwdx1eshxvXOObXwrjq4YGfKf11QJ99TF5anvRyi3mbx/tgbG+rSinrtfXXg2GiMPnFU/fyEeq2jlq86dtma70eoL+Kql60Z1+Vr6vcfqIMnjNcvn3lVnXpffXGZt8hCNtO/v1xdU8fPqKf/0xivT72s3vpYbWwaW27N+VxfxFUvWy2uzU319sfqKe39+XuPqp+9ol5+U112na8DTrP+fJ8bG+r8kjr5njq4oPYNsuarb6uvzY9H3mrzue6Iq162Wlw3NtTJd407WyfeUZ9eUut8KjuKmM/n4X19Q138Sv33/6lnj6snf6MWr9gbbLX5XHfEVS9bMK7l1f4fsP2uoy4su7/mAQib5+etb2yqy1fV2S8cv/qPD/bf++ud333hzuc7T8+8XlNEXPVCXPUSjuvsF2p5Vd3YzP8GiFLR77+8ePWzn/zh4X/+w8PnV8/Ouy6TRFz1Qlz10tS4UBEVzZcAAFQK+RIAABn5EgAAGfkSAAAZ+RIAABn5EgAAGflyNjpZkmSd0c/ttDVgPI9qsPur91S/x9L2nGoFB/dUGvUW8wsTQ76cusHM1edtOx3+1E6Z0ZXi6i/VyRK6qZKcU6mTJYOzGuYXJod8ORuO65UBbcKjKqz+aqdcVNbAYCoZvReYekAx5MvZ8E5a7UwY1WH21+jmHjf4qms0lciXmA7y5Wx4Ji03iyoqly9HP9FnlaR3C/kS00G+nA3P+0eYyBUVyJfcnK0ceyqRLzEd5MvZcL0/lkW3uqz+0u+ac31ZLa6pxPt9MBXky6kzXvwavh+hZSB1Voejv5TS/2yBzqoQ31Ti70kwBeRLAABk5EsAAGTkSwAAZORLAABk5EsAAGTkSwAAZORLAABk5EsAAGTkSwAAZORLAABk5EsAAGTkSwAAZORLAABk5EsAAGTkSwAAZORLAABk5EsAAGTkSwAAZORLAABk5EsAAGTkSwAAZOPly06WtJKsM6G6jF/gxOsDAIBSypsv22mrlbaHP3ayJPdz2i6Vnyab0qzSapYv22lrRGteAEDl+K4vjYTZyRJjRR+kS/LleNrpsEnbaatONQeALcd7P7adDtfvTpYkWWb83P9/739Zmr9I6qfYvmEm8Dw9pCc8/erLnUpypfnrY5bnuZYzdh9cP+crETqKuYdWb+no1hU9AKBavPlSy1zttJW2tQQ6+l8vOxgXSY4137ibG74EHP7W2KyTJcEMZ1xfuuujV81bBWt3XxRxR7FaMHx0+4Y3AKBi/O/3Gd507aVL49/8labrx3xRgW2s30beWQ1XwFvaIJRwab4oIo8Se/RglgYAVEPg/bH9/NDJktHN1951pi/52ReF+p3JgvnS3N+7Q4F8afHldet5VxSho1i3ZiOO7sndAIBKCf09STtttdJskC77r2O29aTgTVfm21dKXF+KTwoVMH+0MpmP40LQFUWZ60tSIgDUW/DvL3vvUTEzhnHrMC5zmC/OBd/YMtyxnZr7+1KsWZo/fea2i7gf64vCu1n++lo+es3e0gsAW1X48wraqfnKWjs17yUGEoz2ftAkTRMrqfnuiZpXqNL7WXOlBROeXGI+dzmjCB1ltEOSpjFHJ18CQC3weXhTw21YAGgQ8uUk6Xda+YNKAGgS8uUkGe+E5S4rADQI+RIAABn5EgAAGfkSAAAZ+RIAABn5EgAAGfkSAAAZ+RIAANn/A/WFw4hMxTMZAAAAAElFTkSuQmCC
OpenStudy (camerondoherty):
bruh.
OpenStudy (anonymous):
the range is the highest value minus the lowest value. So in this case you would do 20-10 and the range is 10
OpenStudy (anonymous):
Well, how do you remember how to find the range???
OpenStudy (anonymous):
I honestly do not know how to figure this :/ my school's curriculum doesn't explain it well
OpenStudy (anonymous):
my school's curriculum doesn't explain it well either
OpenStudy (anonymous):
Okay, to find the range, you subtract the lowest amount from the highest amount
OpenStudy (anonymous):
find the range
OpenStudy (anonymous):
I have never been able to solve problems like that
OpenStudy (anonymous):
The highest amount in the box is ___ and the lowest is ______ Now subtract
OpenStudy (anonymous):
is it 12? or 10
OpenStudy (anonymous):
Where is the dot closest to the left, but still in/on the box???
TheSmartOne (thesmartone):
The link doesn't even work -_-
OpenStudy (anonymous):
Im quite sure it would be 10. the graph is going by twos so I assume the lowest value is 10 and the highest is 20
OpenStudy (anonymous):
so it should be 10 then?
OpenStudy (anonymous):
Im pretty sure, yes
OpenStudy (anonymous):
I think it is 12 because it tells us that the box and whisker points are the results
OpenStudy (anonymous):
10 is not in/on the box
OpenStudy (camerondoherty):
Ok, let me explain There is a box plot. It goes in intervals in 2. Instantly you should be able to identify that the first interval is 10. You find a range by subtracting the maximum from the minimum in the set of numbers. The maximum is 20, the minimum is 10. So you would set up your problem as \[20-10\]You solve that, and you get your solution, easy as that. c:
OpenStudy (anonymous):
I personally think the answer is 18 - 12 but you go with your gut on this one :)
OpenStudy (anonymous):
I have no idea what I should choose...
OpenStudy (anonymous):
I'll fan everyone who answered but idk who to give the medal to
TheSmartOne (thesmartone):
Give it to Cam
TheSmartOne (thesmartone):
:P
TheSmartOne (thesmartone):
She is the only one who explained it :D
TheSmartOne (thesmartone):
And all I see is link a link that doesn't work..
OpenStudy (camerondoherty):
Why would you chose any other method I showed you exactly how to do it...
TheSmartOne (thesmartone):
http://prntscr.com/5da3ob And the question is pretty huge because of that link lol
OpenStudy (anonymous):
I explained it...
OpenStudy (anonymous):
We just came up with two different answers...
OpenStudy (anonymous):
sorry @kmac416 I'd give you a medal if I could but i just don't know
TheSmartOne (thesmartone):
lol Thanks Cammy :P
OpenStudy (anonymous):
It is totally fine!
OpenStudy (camerondoherty):
@kmac416 the points on the end of the line extending from the box are the minimums and the maximums
OpenStudy (camerondoherty):
To find the range, you subtract the maximum from the minimum and get the solution
OpenStudy (anonymous):
Then what is the point of the box? they told us that the box and the points are the results...
OpenStudy (anonymous):
neither 10 or 20 is inside the box
OpenStudy (camerondoherty):
The box contains other points...
OpenStudy (anonymous):
Yeah, 12 16 and 18 which you could use to find the mean median mode and range
OpenStudy (camerondoherty):
OpenStudy (anonymous):
but the range isn't in the box. Its supposed to be the maximum value minus the minimum value, not the values in the box
OpenStudy (anonymous):
Okay, Okay! I was just trying to help! I guess I was wrong but I tried to help so..... :)
OpenStudy (camerondoherty):
Ik @kmac416 srry if I sounded a bit harsh, I didn't mean to cx
OpenStudy (anonymous):
same here. and heres a website you can look at and see if it helps any. It shows how to get the range and interquartile range http://www.google.com/url?sa=i&rct=j&q=&esrc=s&source=images&cd=&cad=rja&uact=8&ved=0CAcQjRw&url=http%3A%2F%2Fcribbd.com%2Fquestion%2Fhow-do-i-make-a-box-and-whisker-plot&ei=Wt6AVOrKCoSSyQSQ4oD4BQ&bvm=bv.80642063,d.aWw&psig=AFQjCNG0wM4TvSp5Gq7Ro1emli5FiIMg3Q&ust=1417818022784842
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