Difference between revisions of "Solution"
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=8-3<br>=5<br> | =8-3<br>=5<br> | ||
'''to back to concept page''' | '''to back to concept page''' | ||
+ | [[http://karnatakaeducation.org.in/KOER/en/index.php/Quadratic_Equations#Hints_for_difficult_problems| quadratic equation problems]]<br> | ||
+ | 2.The altitude of a triangle is 6cm greter than its base. If its area is 108cmsq .Find its base.<br> | ||
+ | [[solution]]<br> | ||
+ | Statement: Solving problem based on quadratic equations.<br> | ||
+ | [[solution]] | ||
+ | *Interpretation of the problem:<br> * Converting data in to eqn.<br> *Knowledge about area of a triangle.<br>*knowledge of the formula of area of triangle.<br>*Methods of finding the roots of the eqn.<br> *Methods of finding the roots of the | ||
+ | *Different approches to solve the problem: <br>*Factorisation | ||
+ | *Using formula | ||
+ | *using graph | ||
+ | *Concept used:Forming the eqn. 216=x(x+6) | ||
+ | 216=x2+6x<br> | ||
+ | x2 +6x -216=0<br> | ||
+ | Substitution: x 2 +18x-12x -216=0<br> | ||
+ | Simplification: x(x+18)-12(x+18)=0<br> | ||
+ | (x+18)( x-12)=0<br> | ||
+ | (x+18)=0 (x-12)=0<br> | ||
+ | x=-18, x=12<br>. | ||
+ | # Base=12cm, <br> Altitude=x+6 | ||
+ | |||
+ | =12+6=18cm.<br> | ||
+ | '''Prior Knowledge''' -<br> | ||
+ | *Methods of solving the Eqn<br> | ||
+ | *Factorisation<br> | ||
+ | *Using Formula<br> | ||
+ | *Using Graph<br> | ||
[[http://karnatakaeducation.org.in/KOER/en/index.php/Quadratic_Equations#Hints_for_difficult_problems| quadratic equation problems]] | [[http://karnatakaeducation.org.in/KOER/en/index.php/Quadratic_Equations#Hints_for_difficult_problems| quadratic equation problems]] |
Revision as of 22:31, 16 August 2014
Hints for difficult problems
- If P & q are the roots of the equation find the value of
Pre requisites:
- Standard form of quadratic equation
- Formula to find the sum & product of quadratic equation
- Knowledge of using appropriate identity
Interpretation of the Problem:
- Compare the equation with standard form and identify the values of a,b,c
- To find the sum formformof the roots of the quadratic equation using the formula
- To find the product of the roots of the equation
- Using the identity & rewriting as
- Substitute the values of m+n & mn in
- Simplification
Concepts:
- Formula to find the sum and product of the roots of the quadratic equation
- Identity
Algorithm:
Consider the equation
Here a=2,b=-4 & c=1
If p & q are the roots of the quadratic equation then
Therefore,
=
=8-3
=5
to back to concept page
[quadratic equation problems]
2.The altitude of a triangle is 6cm greter than its base. If its area is 108cmsq .Find its base.
solution
Statement: Solving problem based on quadratic equations.
solution
- Interpretation of the problem:
* Converting data in to eqn.
*Knowledge about area of a triangle.
*knowledge of the formula of area of triangle.
*Methods of finding the roots of the eqn.
*Methods of finding the roots of the - Different approches to solve the problem:
*Factorisation - Using formula
- using graph
- Concept used:Forming the eqn. 216=x(x+6)
216=x2+6x
x2 +6x -216=0
Substitution: x 2 +18x-12x -216=0
Simplification: x(x+18)-12(x+18)=0
(x+18)( x-12)=0
(x+18)=0 (x-12)=0
x=-18, x=12
.
- Base=12cm,
Altitude=x+6
=12+6=18cm.
Prior Knowledge -
- Methods of solving the Eqn
- Factorisation
- Using Formula
- Using Graph