for each cases how do you know which one will be negative or positive
but I dont understand how to do it
Quickest way is by adding y values of both graphs by plotting points and then using those points, you can make a general graph. (this case makes it rlly easy as its an absolute value function that is translated on the y-axis).but I dont understand how to do it
Follow what i said. Draw a line and mark off -1 and 5. any number x between and including -1 and 5 will have |x+1| + |x-5| = 6 (a fixed sum - so we need at least 1 more for this sum) So x must be outside this interval; x now only needs to be more than 0.5 beyond the 2 numbers -1 and 5; i.e. at least 0.5 to the left of -1 or to the right of 5 along the (number) line.but I dont understand how to do it
uhhhTo me graphing is easier like this:
Draw the number line and mark off the 2 numbers "-1" and "5". The distance between these 2 numbers = 5-(-1) = 6. Now read the inequality this way: the distance of the number x from "-1" plus the distance of x from the number "5" is greater than 7. Now x cannot be a number within the interval:. So x must be outside this interval, to the right of 5 or to the left of -1. In fact we only need x to be greater than 0.5 (2 x 0.5 = 1 = 7 - 6)) to the right of "5" or to the left of "-1", that is
This wordy explanation may make this sound complicated. A simple diagram would show you how easy it is.
Whattt???
Im trying so hard to understand this but I dont get the rest of it from...To me graphing is easier like this:
Draw the number line and mark off the 2 numbers "-1" and "5". The distance between these 2 numbers = 5-(-1) = 6. Now read the inequality this way: the distance of the number x from "-1" plus the distance of x from the number "5" is greater than 7. Now x cannot be a number within the interval:
This wordy explanation may make this sound complicated. A simple diagram would show you how easy it is.
I still dont get itt
Try viewing it on desmos.I still dont get itt
Thats easy for you to say but it doesnt help when I cant do literally anything at all
Just split it up into different domains and take the specific positive and negative values for that, then solve each section like a normal inequality
Say you choose any x between -1 and 5, x = 2, say. then |x+1| + |x-5| = |2+1| + |2 - 5| = 6. Choose another such number, say x = -0.7; then |x+1| + |x-5| = |-0.7 + 1| + |-0.7 -5| =0.3 + 5.7 = 6 (again). If you choose x = -3 (which is more than 0.5 to the left of -1), then |-3+1| + |-3-5| = 2 + 8 = 10 (this is greater than 7). If x = 5.2 (which is NOT more than 0.5 to the right of 5), |5.2 + 1| + |5.2-5| = 6.2 + 0.2 = 6.4 (not more than 7); so 5.2 is not a solution. You only need to look at the question geometrically; no algebra of inequalities needed.
omgg I think I understand it now tyy
I feel bad but I still dont get yours -> like using '0.5' and stuffSay you choose any x between -1 and 5, x = 2, say. then |x+1| + |x-5| = |2+1| + |2 - 5| = 6. Choose another such number, say x = -0.7; then |x+1| + |x-5| = |-0.7 + 1| + |-0.7 -5| =0.3 + 5.7 = 6 (again). If you choose x = -3 (which is more than 0.5 to the left of -1), then |-3+1| + |-3-5| = 2 + 8 = 10 (this is greater than 7). If x = 5.2 (which is NOT more more than 0.5 to the right of 5), |5.2 + 1| + |5.2-5| = 6.2 + 0.2 = 6.4 (not more than 7); so 5.2 is not a solution. You only need to look at the question geometrically; no algebra of inequalities needed.
Note my correction to typo:
OK. Say you take x = 5.7 say. Then this number is |5.7 + 1| = 1 + 5.7 = 6.7 away from the number -1, and |5.7 -5| = 0.7 away from the number 5; so it is = the constant 6 plus 2 x 0.7 from the 2 numbers. Remember, any x outside the closed interval [-1,5] is 6 + twice its distance from the nearer of the 2 numbers -1 and 5. Remember |x+1| is |x -(-1)| and is its distance (how far away from) from the number -1, just as |x-5| is the distance of x from the number 5.
