Question 34892
ALL SQUARE ROOT NUMBERS NEED TO BE COMBINED IN SETS OF TWO COUNTING FROM THR RIGHT OF THE DECIMAL. FOR YOUR NUMBER THIS WOULD BE 5 & 29.

FINDING THE SQUARE ROOT OF THIS NUMBER IS A VARIATION ON A DIVISION STRUCTURE.

FIRST WE FIND THE LARGEST NUMBER WHEN SQUARED IS LESS THAN OR EQUAL TO 5.

THIS NUMBER IS 2. SQUARING THIS NUMBER AND SUBTRACTING (4) FROM 5 WE GET 1.

NOW WE BRING DOWN THE NEXT SET (29) AND APPEND THEM TO THE REMAINDER (1). WE 

NOW HAVE 129 AND WE DOUBLE THE 2 FROM THE QUOTION (4) AND DIVIDE 129 BY 4X. 

X BEING THE SECOND DIGIT IN THE NEW DIVISOR. DIVIDING THE 12 BY 4 WE GET 3. 

NOW THE SECOND DIGIT IN THE QUOTION BECOMES A 3 AND THE DIVISOR NOW BECOMES 

23. NOW WE MULTIPLY 3 TIMES 23 AND WE GET 129. SUBTRACTING 129 FROM 129 WE GET 

A REMAINDER OF 0 AND THE ANSWER IS THE QUOTION OF 23. PROVE IT BY MULTIPLYING 

23 TIMES 23. 

HOPE YOU FOLLOWED THIS AS I AM NOT ABLE TO USING THE GRAPHIC/FORMULAR SYSTEM 

YET.