top button
Flag Notify
    Connect to us
      Site Registration

Site Registration

Slove the following equation :: Sqrt(x+1)-sqrt(x-1) = sqrt(4x-1)

0 votes
547 views

Sqrt(x+1)-sqrt(x-1) = sqrt(4x-1) , we get the solution after solving as x=5/4 . But when we subsitute x=5/4 back in the equation we get 1=2 . Why ??

posted Jun 9, 2015 by Ankit Kamboj

Share this puzzle
Facebook Share Button Twitter Share Button LinkedIn Share Button

2 Answers

0 votes

squaring both sides we get

(x+1) + (x-1) -2*sqrt(x^2-1)== 4x-1

            sqrt(x^2-1)==  .5 - x

      since sqrt of any function is positive hence .5 - x >0

                                                       x<.5

but our solution was x=5/4 ,, hence it has NO Solution .

answer Jun 25, 2015 by Ankit Kamboj
YOU posted this riddle and put the answer.
You can be some sort of inputer.
0 votes

Sqrt(x+1)-sqrt(x-1) = sqrt(4x-1) , we get the solution after solving as x=5/4
substitute in sqrt(x+1)-sqrt(x-1)=sqrt(4*x-1)

we have a right to write
sqrt(1.25+1)-sqrt(1.25-1)=sqrt(4*1.25-1)
and we also have a right to write
(+/- 1.5) - (+/- 0.25) = +/- 2 and we can choose the symbols to our liking to suit our equation
+1.5 - (-.5)=+2
also -1.5 - (+.5)=-2
which are both true Hence 5/4 is correct answer.

answer Feb 23, 2017 by Kewal Panesar



Similar Puzzles
0 votes

Solve the following equation:

enter image description here

The variable x is a real number, and the exponentiation operator is the real exponentiation operator (no complex values).

0 votes

Using algebra or matrix mechanics, solve for x, y, and z. Where x, y, and z are positive integers, and where zero is not an integer or part of an integer.

29x+30y+31z=366. What is the value of x , y, and z? In order to answer the question correctly, you must provide 2 sets of numbers which will satisfy the equation.

Hint: A simple leap year calendar will solve for one set.

Hint #2: Algebra will also solve for another/both sets of numbers. However, a simple 2D matrix (columns and rows) will allow for a quick and easy visualization of the 2 sets of numbers.

Conclusion: Matrices and Feynman type diagrams are often more powerful tools than algebra. Learn to use both, for they are very effective problem solving devices in situations where algebra is too tedious or complicated. And for those that are mathematically challenged and think in terms of pictures rather than numbers, Matrices and Diagrams may be the best solution.

...