How do you solve and write the following in interval notation: #|8-3x|>5#?

Answer 1

#(-oo,1)uu(13/3,+oo)#

Inequalities of the form #|x|>a# have solutions in the form.
#x<-acolor(red)" or " x>a#
#rArr8-3x< -5color(red)" OR " 8-3x>5#
#rArr-3x<-13color(red)" OR " -3x> -3#
#color(white)(XXX)rArrx> 13/3 color(red)" OR " x <1#
[Remember to #color(blue)"reverse signs"# when multiplying or dividing by a #color(blue)"negative quantity"]#
#"Solution is " x<1 " or "x>13/3#
#"Expressed in interval notation as"#
#(-oo,1)uu(13/3,+oo)#
Sign up to view the whole answer

By signing up, you agree to our Terms of Service and Privacy Policy

Sign up with email
Answer 2

See the entire solution process below:

The absolute value function takes any negative or positive term and transforms it to its positive form. Therefore, we must solve the term within the absolute value function for both its negative and positive equivalent.

#-5 > 8 - 3x > 5#
First, subtract #color(red)(8)# from each segment of the system of inequalities to isolate the #x# term while keeping the system balanced:
#-color(red)(8) - 5 > -color(red)(8) + 8 - 3x > -color(red)(8) + 5#
#-13 > 0 - 3x > -3#
#-13 > -3x > -3#
Now, divide each segment by #color(blue)(-3)# to solve for #x# while keeping the system balanced. However, because we are multiplying or dividing inequalities by a negative term we must reverse the inequality operators:
#(-13)/color(blue)(-3) color(red)(<) (-3x)/color(blue)(-3) color(red)(<) (-3)/color(blue)(-3)#
#13/3 color(red)(<) (color(blue)(cancel(color(black)(-3)))x)/cancel(color(blue)(-3)) color(red)(<) 1#
#13/3 color(red)(<) x color(red)(<) 1#

Or

#x > 13/3# and #x < 1#

Or, in interval form:

#(13/3, oo)# and #(-oo, 1)#
Sign up to view the whole answer

By signing up, you agree to our Terms of Service and Privacy Policy

Sign up with email
Answer 3

To solve the absolute value inequality |8 - 3x| > 5, you need to consider two cases:

Case 1: (8 - 3x > 5) (8 - 3x > 5) Subtract 8 from both sides: (-3x > -3) Divide both sides by -3 (note that dividing by a negative number reverses the inequality sign): (x < 1)

Case 2: (8 - 3x < -5) (8 - 3x < -5) Subtract 8 from both sides: (-3x < -13) Divide both sides by -3 (note that dividing by a negative number reverses the inequality sign): (x > \frac{13}{3})

So, the solution in interval notation is: ((-\infty, 1) \cup (\frac{13}{3}, +\infty))

Sign up to view the whole answer

By signing up, you agree to our Terms of Service and Privacy Policy

Sign up with email
Answer from HIX Tutor

When evaluating a one-sided limit, you need to be careful when a quantity is approaching zero since its sign is different depending on which way it is approaching zero from. Let us look at some examples.

When evaluating a one-sided limit, you need to be careful when a quantity is approaching zero since its sign is different depending on which way it is approaching zero from. Let us look at some examples.

When evaluating a one-sided limit, you need to be careful when a quantity is approaching zero since its sign is different depending on which way it is approaching zero from. Let us look at some examples.

When evaluating a one-sided limit, you need to be careful when a quantity is approaching zero since its sign is different depending on which way it is approaching zero from. Let us look at some examples.

Not the question you need?

Drag image here or click to upload

Or press Ctrl + V to paste
Answer Background
HIX Tutor
Solve ANY homework problem with a smart AI
  • 98% accuracy study help
  • Covers math, physics, chemistry, biology, and more
  • Step-by-step, in-depth guides
  • Readily available 24/7