Manuals/calci/INTERCEPT

• This function is calculating the point where the line is intersecting y-axis using dependent and independent variables.
• Using this function we can find the value of   when   is zero.
• The intercept point is finding using simple linear regression.
• It is fits a straight line through the set of   points in such a way that makes vertical distances between the points of the data set and the fitted line as small as possible.
• Regression methods nearly to the simple ordinary least squares also exist.
• i.e.,The Least Squares method relies on taking partial derivatives with respect to the slope and intercept which provides a solvable pair of equations called normal equations.
• Suppose there are   data points  , where  
• To find the equation of the regression line: .
• This equation will give a "best" fit for the data points.
• The "best" means least-squares method. Here b is the slope.
• The slope is calculated by: .
• In this formula  and  are the sample means AVERAGE of   and  .
• In  , the arguments can be numbers, names, arrays, or references that contain numbers.
• The arrays values are disregarded when it is contains text, logical values or empty cells.
• This function will return the result as error when any one of the argument is non-numeric or   and   is having different number of data points and there is no data.

DATA1 DATA2

  4                   12
  5                   20
  2                   15

10 11

INTERCEPT(B5:B8,C5:C8)=10.13265306

DATA1 DATA2

    25                 10
   -12                 15   
     -9               -40
    30                 52 
    18                 36

INTERCEPT(A2:A6,B2:B6)=4.754939085