<p>Yeah, there’s no question, it was 8.</p>
<p>what did you guys get for the question with the parallel lines and roman numeral choices</p>
<p>intersect, same line, and parallel i think were the choices</p>
<p>I said intersect only</p>
<p>wasn’t the abcd problem acdb because b was 2 to the left c was 5 to the right and d was 7 to the right and 8 to the left?</p>
<p>i said there was 16 as well
im pretty sure i didnt count anything twice</p>
<p>10char oops</p>
<p>was something 44</p>
<p>an answer was 19,20 right?</p>
<p>smething was like y=5t+14 YA?!?!
and 8a-4b+2c i think thats wrong but anyone remember the right thing</p>
<p>the abcd problem had the four points on a circle. And it was clockwise/counterclockwise. No right or left. Answer was ACDB almost positive. A is there. B is 2 to the counterclockwise. C is 4 or 5 clockwise. D is 8 clockwise</p>
<p>its only 4 because a square can only be symmetric around four lines and these are the two diagonals and the lines that go through the midpoints. The diagonals of one square are the midpoint segments of the other and vice versa, thus its only 4 lines of symmetry.</p>
<p>I really think its 8 because if you draw a diameter thru the circle starting from each peak and valley you will get 8 different lines before you have to start drawing over lines you’ve already drawn</p>
<p>tbonus this is math lol! but yeah i guessed there too i ran out of time…i put c for all of them. i hda to guess like 6-7 on the end. im just hoping a couple of them are c then ill be fine. i think i did well on the rest of the reading.</p>
<p>There were not just 4…</p>
<p>So is it ADCB or ACDB?</p>
<p>Any more opinions?</p>
<p>OMG i did count them twice!! should’ve really sketched the lines AHH :(</p>
<p>It’s ACDB B was 2 counter clockwise C was 5 clockwise and D was 7-8 clockwise so going around clockwise you get ACDB</p>
<p>simply put it like this. A SQUARE ONLY HAS 4 LINES OF SYMMETRY. ONE SQUARE WAS ROTATED 45 DEGREES SO THE LINES OF SYMMTERIES FOR BOTH SQUARES ARE THE SAME. ITS JUST THAT ONE HAS THEM AS THE DIAGONALS AND THE OTHER HAS THEM AS THE NONDIAGONALS LINES OF SYMMETRIES AND VICE VERSA</p>
<p>I definitely put ACDB, and I spent waaaay too much time on that problem. I’m so worried about my math score.</p>
<p>On the list someone posted a while back, the determinant question is listed as 4; I think I put 2. Anyone else?</p>
<p>SYMMETRY QUESTION:</p>
<p>Aren’t there 16? you could draw lines through the vertex they shared as well as the ones on the rim of the circle.
Correct me?</p>
<p>R u sure C was clockwise?</p>
<p>lol 2 ferniesoccer1’s rage. I still think it was 8.</p>
<p>I put 4 lines of symmetry. How could there be 8 or 16 lines of symmetry? A square was inscribed into the circle, so any line of symmetry would have to pass through the square and a square only has 4 lines of symmetry. I originally put 16 but if you think about it logically then i think it should be 4</p>