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	<title>NCERT Solutions for Class 9 Maths Chapter 2 Polynomials Ex 2.4 &#8211; MCQ Questions</title>
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		<title>NCERT Solutions for Class 9 Maths Chapter 2 Polynomials Ex 2.4</title>
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		<category><![CDATA[NCERT Solutions for Class 9 Maths Chapter 2 Polynomials Ex 2.4]]></category>
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					<description><![CDATA[NCERT Solutions for Class 9 Maths Chapter 2 Polynomials Ex 2.4 are part of NCERT Solutions for Class 9 Maths. Here we have given NCERT Solutions for Class 9 Maths Chapter 2 Polynomials Ex 2.4. Board CBSE Textbook NCERT Class Class 9 Subject Maths Chapter Chapter 2 Chapter Name Polynomials Exercise Ex 2.4 Number of ... <a title="NCERT Solutions for Class 9 Maths Chapter 2 Polynomials Ex 2.4" class="read-more" href="https://mcqquestions.guru/ncert-solutions-for-class-9-maths-chapter-2-ex-2-4/" aria-label="Read more about NCERT Solutions for Class 9 Maths Chapter 2 Polynomials Ex 2.4">Read more</a>]]></description>
										<content:encoded><![CDATA[<p>NCERT Solutions for Class 9 Maths Chapter 2 Polynomials Ex 2.4 are part of <a href="https://mcqquestions.guru/ncert-solutions-for-class-9-maths/">NCERT Solutions for Class 9 Maths</a>. Here we have given NCERT Solutions for Class 9 Maths Chapter 2 Polynomials Ex 2.4.</p>
<table style="table-layout: fixed; width: 650px;">
<tbody>
<tr>
<td><strong>Board</strong></td>
<td>CBSE</td>
</tr>
<tr>
<td><strong>Textbook</strong></td>
<td>NCERT</td>
</tr>
<tr>
<td><strong>Class</strong></td>
<td>Class 9</td>
</tr>
<tr>
<td><strong>Subject</strong></td>
<td>Maths</td>
</tr>
<tr>
<td><strong>Chapter</strong></td>
<td>Chapter 2</td>
</tr>
<tr>
<td><strong>Chapter Name</strong></td>
<td>Polynomials</td>
</tr>
<tr>
<td><strong>Exercise</strong></td>
<td>Ex 2.4</td>
</tr>
<tr>
<td><strong>Number of Questions Solved</strong></td>
<td>5</td>
</tr>
<tr>
<td><strong>Category</strong></td>
<td><a title="NCERT Solutions" href="https://mcqquestions.guru/ncert-solutions/">NCERT Solutions</a></td>
</tr>
</tbody>
</table>
<h2>NCERT Solutions for Class 9 Maths Chapter 2 Polynomials Ex 2.4</h2>
<p><span style="color: #eb4924;"><strong>Question 1.<br />
</strong></span><strong>Determine which of the following polynomials has (x +1) a factor.</strong><br />
<strong>(i) x<sup>3</sup>+x<sup>2</sup>+x +1</strong><br />
<strong>(ii) x<sup>4</sup> + x<sup>3</sup> + x<sup>2</sup> + x + 1</strong><br />
<strong>(iii) x<sup>4</sup> + 3x<sup>3</sup> + 3x<sup>2</sup> + x + 1 </strong><br />
<strong>(iv) x<sup>3</sup> &#8211; x<sup>2</sup> &#8211; (2 +√2 )x + √2<br />
</strong><span style="color: #008000;"><strong>Solution:<br />
</strong></span>The zero of x + 1 is -1.<br />
<strong>(i)</strong> Let p (x) = x<sup>3</sup> + x<sup>2</sup> + x + 1<br />
Then, p (-1) = (-1)<sup>3</sup> + (-1)<sup>2</sup> + (-1) + 1 .<br />
= -1 + 1 &#8211; 1 + 1<br />
⇒ p (- 1) = 0<br />
So, by the Factor theorem (x+ 1) is a factor of x<sup>3</sup> + x<sup>2</sup> + x + 1.<br />
<strong>(ii)</strong> Let p (x) = x<sup>4</sup> + x<sup>3</sup> + x<sup>2</sup> + x + 1<br />
Then, P(-<span style="font-size: 13.3333px;">1</span>) = (-1)<sup>4</sup> + (-1)<sup>3</sup> + (-1)<sup>2</sup> + (-1)+1<br />
= 1 &#8211; 1 + 1 &#8211; 1 + 1<br />
⇒ P (-1) = 1<br />
So, by the Factor theorem (x + 1) is not a factor of x<sup>4</sup> + x<sup>3</sup> + x<sup>2</sup> + x+ 1.<br />
<strong>(iii)</strong> Let p (x) = x<sup>4</sup> + 3x<sup>3</sup> + 3x<sup>2</sup> + x + 1 .<br />
Then, p (-1)= (-1)<sup>4</sup> + 3 (-1)<sup>3</sup> + 3 (-1)<sup>2</sup> + (- 1)+ 1<br />
= 1- 3 + 3 &#8211; 1 + 1<br />
⇒ p (-1) = 1<br />
So, by the Factor theorem (x + 1) is not a factor of x<sup>4</sup> + 3x<sup>3</sup> + 3x<sup>2</sup> + x+ 1.<br />
<strong>(iv)</strong> Let p (x) = x<sup>3</sup> &#8211; x<sup>2</sup> &#8211; (2 + √2) x + √2<br />
Then, p (- 1) =(- 1)3- (-1)2 &#8211; (2 + √2)(-1) + √2<br />
= -1 &#8211; 1+ 2 +√2+√2<br />
= 2√2<br />
So, by the Factor theorem (x + 1) is not a factor of<br />
x<sup>3</sup> &#8211; x<sup>2</sup> &#8211; (2 + √2) x + √2.</p>
<p><span style="color: #eb4924;"><strong>Question 2.<br />
</strong></span><strong>Use the Factor Theorem to determine whether g (x) is a factor of p (x) in each of the following cases</strong><br />
<strong>(i) p (x)= 2x<sup>3</sup> + x<sup>2</sup> &#8211; 2x &#8211; 1, g (x) = x + 1</strong><br />
<strong>(ii) p(x)= x<sup>3</sup> + 3x<sup>2</sup> + 3x + X g (x) = x + 2</strong><br />
<strong>(iii) p (x) = x<sup>3</sup> &#8211; 4x<sup>2</sup> + x + 6, g (x) = x &#8211; 3</strong><br />
<span style="color: #008000;"><strong>Solution:<br />
</strong></span><strong>(i)</strong> The zero of g (x) = x + 1 is x= -1.<br />
Then, p (-1) = 2 (-1)<sup>3</sup>+ (-1)<sup>2</sup> &#8211; 2 (-1)-1 [∵ p(x) = 2x<sup>3</sup> + x<sup>2</sup> &#8211; 2x -1]<br />
= -2 + 1 + 2 &#8211; 1<br />
⇒ P (- 1)= 0<br />
Hence, g (x) is a factor of p (x).<br />
<strong><br />
(ii)</strong> The zero of g (x) = x + 2 is &#8211; 2.<br />
Then, p (- 2) = (- 2)<sup>3</sup> + 3 (- 2)<sup>2</sup> +3 (- 2) + 1 [∵ p(x) = x<sup>3</sup> + 3x<sup>2</sup> + 3x + 1]<br />
= &#8211; 8 + 12 &#8211; 6 + 1<br />
⇒ p(-2) = -1<br />
Hence, g (x) is not a factor of p (x).<br />
<strong><br />
(iii)</strong> The zero of g (x) = x &#8211; 3 is 3.<br />
Then, p (3) = 3<sup>3</sup> &#8211; 4 (3)<sup>2</sup>+3 + 6 [∵ p(x) = x<sup>3</sup>-4x<sup>2</sup> + x+6]<br />
= 27 &#8211; 36+ 3 +6<br />
⇒ p(3) = 0<br />
Hence, g (x) is a factor of p (x).</p>
<p><span style="color: #eb4924;"><strong>Question 3.<br />
</strong></span><strong>Find the value of k, if x &#8211; 1 is a factor of p (x) in each of the following cases</strong><br />
<strong>(i) p (x) = x<sup>2</sup> + x + k</strong><br />
<strong> (ii) p (x) = 2x<sup>2</sup> + kx + √2</strong><br />
<strong>(iii) p (x) = kx<sup>2</sup> &#8211; √2 x + 1 </strong><br />
<strong>(iv) p (x) = kx<sup>2</sup> &#8211; 3x + k</strong><br />
<span style="color: #008000;"><strong>Solution:<br />
</strong></span>The zero of x &#8211; 1 is 1.<br />
<strong>(i)</strong> (x &#8211; 1) is a factor of p (x),then p(1)= 0 (By Factor theorem)<br />
⇒ 1<sup>2</sup> + 1 + k = 0 [∵ p(x) = x<sup>2</sup> + x + k]<br />
⇒ 2 + k =0<br />
⇒ k = -2<br />
<strong>(ii)</strong> ∵ (x -1) is a factor of p (x), then p (1) = 0 (By Factor theorem)<br />
⇒ 2(1)<sup>2</sup> + k(1)+√2= 0 [∵p(x) = 2x<sup>2</sup> + kx+ -√2]<br />
⇒ 2 + k + √2 = 0<br />
⇒ k = &#8211; (2 + √2)<br />
<strong>(iii)</strong> ∵ (x-1) is a factor of p (x), then p (1) = 0 (By Factor theorem)<br />
⇒ k (1)<sup>2</sup> &#8211; √2 + 1 = 0 [∵p(x) = kx<sup>2</sup> &#8211; √2x + 1]<br />
⇒ k = (√2 &#8211; 1)<br />
<strong>(iv)</strong> ∵ (x-1) is a factor of p (x), then p (1) = 0 (By Factor theorem)<br />
⇒ k(1)<sup>2</sup> &#8211; 3 + k = 0 [∵p(x) = kx<sup>2</sup> &#8211; 3x + k]<br />
⇒ 2k-3 = 0<br />
⇒ k = \(\frac { 3 }{ 2 }\)</p>
<p><span style="color: #eb4924;"><strong>Question 4.<br />
</strong></span><strong>Factorise</strong><br />
<strong>(i) 12x<sup>2</sup> &#8211; 7x +1 </strong><br />
<strong>(ii) 2x<sup>2</sup> + 7x + 3 </strong><br />
<strong>(iii) 6x<sup>2</sup> + 5x &#8211; 6</strong><br />
<strong>(iv) 3x<sup>2</sup> &#8211; x &#8211; 4<br />
</strong><span style="color: #008000;"><strong>Solution:</strong></span><br />
<strong>(i)</strong> 12x<sup>2</sup> &#8211; 7x + 1 = 12x<sup>2</sup> &#8211; 4x- 3x + 1 (Splitting middle term)<br />
= 4x (3x &#8211; -0 -1 (3x-1)<br />
= (3x -1) (4x -1)<br />
<strong>(ii)</strong>2x<sup>2</sup> + 7x + 3 = 2x<sup>2</sup> + 6x + x + 3 (Splitting middle term)<br />
= 2x (x + 3) +1 (x + 3) = (x + 3) (2x+ 1)<br />
<strong>(iii)</strong> 6x<sup>2</sup> + 5x &#8211; 6= 6x<sup>2</sup> + 9x- 4x- 6 (Splitting middle term)<br />
= 3x(2x+3)-2(2x+3)=(2x+3)(3x-2)<br />
<strong>(iv)</strong> 3x<sup>2</sup> &#8211; x- 4= 3x<sup>2</sup>-4x+3x-4 (Splitting middle term)<br />
= x (3x &#8211; 4) + 1 (3x &#8211; 4)= (3x- 4) (x + 1)</p>
<p><span style="color: #eb4924;"><strong>Question 5.<br />
</strong></span><strong>Factorise</strong><br />
<strong>(i) x<sup>3</sup> &#8211; 2x<sup>2</sup> &#8211; x + 2 </strong><br />
<strong>(ii) x<sup>3</sup> &#8211; 3x<sup>2</sup> &#8211; 9x &#8211; 5</strong><br />
<strong>(iii) x<sup>3</sup> + 13x<sup>2</sup> + 32x + 20 </strong><br />
<strong>(iv) 2y<sup>3</sup> + y<sup>2</sup> &#8211; 2y &#8211; 1<br />
</strong><span style="color: #008000;"><strong>Solution:<br />
</strong></span><strong>(i)</strong> Let p (x) = x<sup>3</sup> &#8211; 2x<sup>2</sup> &#8211; x+ 2, constant term of p (x) is 2.<br />
Factors of 2 are ± 1 and ± 2.<br />
Now, p (1) = 1<sup>3</sup> &#8211; 2 (1)<sup>2</sup> &#8211; 1 + 2<br />
=1- 2 &#8211; 1 + 2<br />
p(1) = 0<br />
By trial, we find that p (1) = 0, so (x &#8211; 1) is a factor of p (x).<br />
So, x<sup>3</sup> &#8211; 2x<sup>2</sup> &#8211; x+ 2<br />
= x<sup>3</sup> &#8211; x<sup>2</sup> &#8211; x<sup>2</sup> + x &#8211; 2x + 2<br />
= x<sup>2</sup> ( x -1)- x (x &#8211; 1)-2 (x &#8211; 1)<br />
= (x &#8211; 1)(x<sup>2</sup> &#8211; x &#8211; 2)<br />
= (x &#8211; 1)(x<sup>2</sup> &#8211; 2x+x-2)<br />
= (x &#8211; 1) [x (x &#8211; 2) + 1 (x &#8211; 2)]<br />
= (x &#8211; 1) (x &#8211; 2)(x + 1)<br />
<strong><br />
(ii)</strong> Let p(x) = x<sup>3</sup> &#8211; 3x<sup>2</sup> &#8211; 9x &#8211; 5<br />
By trial, we find that p(5) = (5)<sup>3</sup> &#8211; 3(5)<sup>2</sup> &#8211; 9(5) &#8211; 5<br />
=125 &#8211; 75 &#8211; 45 &#8211; 5 = 0<br />
So, (x &#8211; 5) is a factor of p(x).<br />
So, x<sup>3 </sup>&#8211; 3x<sup>2 </sup>&#8211; 9x &#8211; 5<br />
= x<sup>3</sup>-5x<sup>2</sup> + 2x<sup>2</sup>-10x+x-5<br />
= x<sup>2</sup>(x &#8211; 5)+2x(x &#8211; 5)+1(x &#8211; 5)<br />
= (x &#8211; 5) (x<sup>2</sup> + 2x + 1)<br />
= (x &#8211; 5) (x<sup>2</sup> + x + x + 1)<br />
= (x &#8211; 5) [x (x + 1)+ 1 (x+ 1)]<br />
= (x &#8211; 5) (x + 1) (x + 1)<br />
= (x &#8211; 5)(x+1)<sup>2<br />
</sup><strong><br />
(iii)</strong> Let p (x) = x<sup>3</sup> + 13x<sup>2</sup> + 32x + 20<br />
By trial, we find that p (-1) = (-1)<sup>3</sup> + 13(-1)<sup>2</sup> + 32 (-1) + 20<br />
= -1+13 &#8211; 32 + 20 = -33 + 33 = 0<br />
So (x + 1) is a factor of p (x).<br />
So, x<sup>3</sup> + 13x<sup>2</sup> + 32x + 20<br />
= x<sup>3</sup>+ x<sup>2</sup> + 12x<sup>2</sup> + 12x+ 20x+ 20<br />
=x<sup>2</sup>(x+ 1) + 12x(x+ 1)+ 20 (x+ 1)<br />
= (x+1)(x<sup>2</sup>+12x+20)<br />
= (x+ 1) (x<sup>2</sup>+ 10x + 2x+ 20)<br />
= (x+1)[x(x+10)+2(x+10)]<br />
= (x+ 1) (x+ 10) (x + 2)<br />
<strong><br />
(iv)</strong> Let p (y) = 2y<sup>3</sup> + y<sup>2</sup> &#8211; 2y -1<br />
By trial we find that p(1) = 2 (1)<sup>3</sup> + (1)<sup>2</sup> &#8211; 2(1) &#8211; 1 = 2 + 1 &#8211; 2 -1 = 0<br />
So (y -1) is a factor of p (y).<br />
So, 2y<sup>3</sup> + y<sup>2</sup> &#8211; 2y -1<br />
= 2y<sup>3</sup> &#8211; 2y<sup>2</sup>+ 3y<sup>2</sup> &#8211; 3y + y &#8211; 1<br />
= 2y<sup>2</sup>(y &#8211; 1) + 3y(y &#8211; 1)+1(y &#8211; 1)<br />
= (y &#8211; 1) (2y<sup>2</sup> + 3y + 1)<br />
= (y &#8211; 1)(2y<sup>2</sup> + 2y +y+1)<br />
= (y &#8211; 1 [2y (y + 1) + 1 (y + 1)]<br />
= (y &#8211; 1)(y+1)(2y+1)</p>
<p>We hope the NCERT Solutions for Class 9 Maths Chapter 2 Polynomials Ex 2.4, help you. If you have any query regarding NCERT Solutions for Class 9 Maths Chapter 2 Polynomials Ex 2.4, drop a comment below and we will get back to you at the earliest.</p>
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