Saturday, June 23, 2018

RS Aggarwal Class 10 Solutions Quadratic Equations Exercise 10A

RS Aggarwal Class 10 Solutions Quadratic Equations Exercise 10A



Question 1:
(i)   x2-x+3=0 is a quadratic polynomial.
∴  x2-x+3=0 is a quadratic equation.
(ii) 2x2+ [latex]\frac { 5 }{ 2 }   [/latex]x-√3=0
⇒ 4x2+5x-2√3=0
Clearly is 4x2+5x-2√3=0 a quadratic polynomial.
∴ 2x2+ [latex]\frac { 5 }{ 2 }   [/latex]x-√3=0 is a quadratic equation.
(iii) √2x2+7x+5√2=0 is a quadratic polynomial.
∴ √2x2+7x+5√2=0 is a quadratic equation.
(iv)[latex]\frac { 1 }{ 3 }   [/latex]x2+[latex]\frac { 1 }{ 5 }   [/latex]x-2=0
⇒ 5x2+3x-2=0
Clearly, 5x2+3x-2=0 is a quadratic equation.
[latex]\frac { 1 }{ 3 }   [/latex]x2+[latex]\frac { 1 }{ 5 }   [/latex] is a quadratic equation.
(v) x2-3x-√x+4=0 is not a quadratic polynomial since it contains √x, in which power 1/2 of x is not an integer.
∴ x2-3x-√x+4=0 is not a quadratic equation.
(vi) x-[latex]\frac { 6}{ x }   [/latex]=3
⇒ x2-3x-6 =0
And (x2-3x-6)Being a polynomial of degree 2, it is a quadratic polynomial.
Hence, x-[latex]\frac { 6}{ x }   [/latex]=3 is a quadratic equation.
(vii) x+[latex]\frac { 2}{ x }   [/latex]= x2
⇒ x3-x2-2 =0
And (x3-x2-2 =0) being a polynomial of degree 3, it is not a quadratic polynomial.
Hence, x+[latex]\frac { 2}{ x }   [/latex]= x2 is not a quadratic equation.
(viii) [latex]{ x }^{ 2 }-\frac { 1 }{ { x }^{ 2 } } =5  [/latex] ⇒ x4 -1=5x2
⇒x4-5x2-1 =0
And (x4-5x2-1 =0) being a polynomial of degree 4.

Hence [latex]{ x }^{ 2 }-\frac { 1 }{ { x }^{ 2 } } =5  [/latex] is not a quadratic equation.

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