Answers>Maths>A Level>Article

Solve the equation |3x + 4| = |3x - 11|

Here we have an equation involving absolute values. As a general rule |a| = +a and |a| = -a. We can apply that to our RHS. In the first case we get that 3x + 4 = 3x - 11, however after we subtract 3x from both sides we are left with 4 = -11, which is obviously false. Therefore, we conclude that there are no solutions for |a| = +a and we move on to |a| = -a. Applying our formula again we have 3x + 4 = - (3x - 11) or 3x + 4 = - 3x + 11. Rearranging we get that 6x = 7 or that x = 7/6.

Answered by Viktoria B. • Maths tutor

6393 Views

See similar Maths A Level tutors

Related Maths A Level answers

All answers ▸

Differentiate x^3⋅cos(5⋅x) with respect to x.

The point P (4, –1) lies on the curve C with equation y = f( x ), x > 0, and f '(x) =x/2 - 6/√x + 3. Find the equation of the tangent to C at the point P , giving your answer in the form y = mx + c. Find f(x)

Given that y = x^4 + x^(1/3) + 3, find dy/dx

How do you do simple integration?

We're here to help

Message us on Whatsapp

+44 (0) 203 773 6020

Company Information

Popular Requests

Maths tutor Chemistry tutor Physics tutor Biology tutor English tutor GCSE tutors A level tutors IB tutors Physics & Maths tutors Chemistry & Maths tutors GCSE Maths tutors

© MyTutorWeb Ltd 2013–2024

Terms & Conditions|Privacy Policy

CLICK CEOP

Internet Safety

Payment Security

Cyber

Essentials