Hints for difficult problems

1. If P & q are the roots of the equation ${\displaystyle 2a^{2}-4a+1=0}$ find the value of

${\displaystyle p^{3}+q^{3}}$ Pre requisites:

1. Standard form of quadratic equation
2. Formula to find the sum & product of quadratic equation
3. Knowledge of using appropriate identity

Interpretation of the Problem:

1. Compare the equation with standard form and identify the values of a,b,c
2. To find the sum formformof the roots of the quadratic equation using the formula
3. To find the product of the roots of the equation
4. Using the identity & rewriting ${\displaystyle p^{3}+q^{3}}$ as ${\displaystyle (p+q)^{3}-3pq(p+q)}$
5. Substitute the values of m+n & mn in ${\displaystyle (p+q)^{3}-3pq(p+q)}$
6. Simplification

Concepts:

1. Formula to find the sum and product of the roots of the quadratic equation
2. Identity ${\displaystyle (a+b)^{3}=a^{3}+b^{3}+3ab(a+b)}$

Algorithm:
Consider the equation ${\displaystyle 2a^{2}-4a+1=0}$
Here a=2,b=-4 & c=1
If p & q are the roots of the quadratic equation then
${\displaystyle p+q={\frac {-b}{a}}={{\frac {-(-4)}{2}}=2}}$
${\displaystyle pq={\frac {c}{a}}={\frac {1}{2}}}$
Therefore,
${\displaystyle p^{3}+q^{3}=(p+q)^{3}-3pq(p+q)}$
=${\displaystyle (2)^{3}-3[{\frac {1}{2}}](2)}$
=8-3
=5
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