SPM Practice 2 (Question 1 – 3)

Question 1:
Reduce non-linear relation,  y=p x n1 , where k and n are constants, to linear equation.  State the gradient and vertical intercept for the linear equation obtained.
[Note : Reduce No-linear function to linear function]

Solution:


 

Question 2:
The diagram shows a line of best fit by plotting a graph of  y 2 against  x .

  1. Find the equation of the line of best fit.
  2. Determine the value of
    1. x when y = 4,
    2. y when x = 25.
Solution:



 

Question 3:
The diagram shows part of the straight line graph obtained by plotting y against x 2 .

Express y in terms of x.

Solution:



 

SPM Practice 3 (Linear Law) – Question 1


Question 1 (10 marks):
Use a graph to answer this question.
Table 1 shows the values of two variables, x and y, obtained from an experiment.
The variables x and y are related by the equation y h = hk x , where h and k are constants.


(a) Plot xy against x, using a scale of 2 cm to 1 unit on the x-axis and 2 cm to 5 units on the xy-axis.
Hence, draw the line of best fit.

(b) Using the graph in 9(a), find
(i) the value of h and of k,
(ii) the correct value of y if one of the values of y has been wrongly recorded during the experiment.

Solution: 
(a)




(b)
y h = hk x xy h x=hk xy= h x+hk Y=mX+C Y=xy, m= h , C=hk


(b)(i)
m= 36.5 5.1 h = 36.5 5.1 h =7.157 h=51.22 C=4 hk=4 k= 4 h k= 4 51.22 k=0.0781


(b)(ii)
xy=21 3.5y=21 y= 21 3.5 =6.0 Correct value of y is 6.0.


Tips To Reduce Non-Linear Function To Linear Function

Tips:
(1)  The equation must have one constant (without x and y).
(2)  X and Y cannot have constant, but can have the variables (for example x and y).
(3)  m and c can only have the constant (for example a and b), cannot have the variables x and y.


Examples
(1)
X and Y cannot have constant, but can have the variables (for example x and y)



(2)
 m and c can only have the constant (for example a and b), cannot have the variables x and y





SPM Practice 2 (Linear Law) – Question 4

Question 4
The table below shows the corresponding values of two variables, x and y, that are related by the equation y = q x + p q x , where p and q are constants.


One of the values of y is incorrectly recorded.
(a) Using scale of 2 cm to 5 units on the both axis, plot the graph of xy against x 2  .  Hence, draw the line of best fit

(b) Use your graph in (a) to answer the following questions:
(i) State the values of y which is incorrectly recorded and determine its actual value.
(ii) Find the value of p and of q.

Solution
Step 1 : Construct a table consisting X and Y.


Step 2 : Plot a graph of Y against X, using the scale given and draw a line of best fit


Steps to draw line of best fit - Click here

(b) (i) State the values of y which is incorrectly recorded and determine its actual value.


Step 3 : Calculate the gradient, m, and the Y-intercept, c, from the graph

Step 4 : Rewrite the original equation given and reduce it to linear form

Step 5 : Compare with the values of m and c obtained, find the values of the unknown required

Reduce Non-Linear Function To Linear Function – Examples (G) To (L)

Examples:
Reduce each of the following equations to the linear form. Hence, state the gradient and the Y-intercept of the linear equations in terms of  a and b.
(g)  k x 2 + t y 2 = x  
(h)  y = x p + q x  
(i)  h y = x + k x  
(j)  y = a b x  
(k)  y = a x b  
(l)  y = a b x + 1

[Note :
X and Y cannot have constant, but can have the variables (for example x and y)
 m and c can only have the constant (for example a and b), cannot have the variables x and y]

Solution:












SPM Practice 3 (Linear Law) – Question 3

Question 3
The table below shows the values of two variables, x and y, obtained from an experiment. The variables x and y are related by the equation a y = b x + 1 , where k and p are constants.


(a) Based on the table above, construct a table for the values of 1 x and 1 y . Plot 1 y against 1 x , using a scale of  2 cm to 0.1 unit on the 1 x - axis and  2 cm to 0.2 unit on the 1 y - axis. Hence, draw the line of best fit.
(b) Use the graph from  (b)  to find the value of
(i)  a,
(ii)  b.


Solution

Step 1 : Construct a table consisting X and Y.




Step 2 : Plot a graph of Y against X, using the scale given and draw a line of best fit

Steps to draw line of best fit - Click here




Step 3 : Calculate the gradient, m, and the Y-intercept, c, from the graph




Step 4 : Rewrite the original equation given and reduce it to linear form

Step 5 : Compare with the values of m and c obtained, find the values of the unknown required

Revise of Important Concept – Straight Line


(A) Equation of a straight Line 

 An equation of straight line is given by y = mx + c.
The variables x and y are linearly related
The term c is known as y-intercept. It represents the y value where the line cuts the y-axis
The term m is the gradient of the straight line and its value is constant



(B) Gradient of a Straight Line
If the points A ( x 1 , y 1 )  and B ( x 2 , y 2 )   lie on the straight line y = m x + c , then gradient of ,the straight line
m = y 2 y 1 x 2 x 1 o r y 1 y 2 x 1 x 2



(C) Mid Point 



Mid Point AB is given by M = ( x 1 + x 2 2 , y 1 + y 2 2 )


(D) Distance Between Two Points
Distance between point A ( x 1 , y 1 ) and point is B ( x 2 , y 2 ) given by ( x 1 x 2 ) 2 + ( y 1 y 2 ) 2

Equations Of Line Of Best Fit


A set of two variables are related non linearly can be converted to a linear equation.  The line of best fit can be written in the form

Y = mX + c


where
X and Y are in terms of x and/or y
m is the gradient,
c is the Y-intercept

Recall: To find equation of straight line
(1)  Equation of a straight line if gradient (m) and one points ( x 1 , y 1 ) are given:
Y y 1 = m ( X x 1 )
(2)  Equation of a straight line if gradient (m) and y-intercept (c) are given:
Y = m X + c