वास्तविक संख्याओं पर संक्रियाएँ: Difference between revisions

Revision as of 16:29, 2 November 2024

यहां हम वास्तविक संख्याओं पर संक्रियाओं की विधि को सीखेंगे।

वास्तविक संख्याओं पर संक्रियाओं का नियम

एक परिमेय संख्या और अपरिमेय संख्या का योग या अंतर अपरिमेय होता है।
अपरिमेय संख्या के साथ एक गैर-शून्य परिमेय संख्या का गुणनफल या भागफल अपरिमेय संख्या होती है।
जब दो अपरिमेय संख्याओं को जोड़ा, घटाया, गुणा या विभाजित किया जाता है, तो परिणाम एक परिमेय या अपरिमेय संख्या हो सकती है।

यदि $a$ और $b$ धनात्मक वास्तविक संख्याएँ हैं, तो हमारे पास है,

${\sqrt {ab}}={\sqrt {a}}{\sqrt {b}}$
${\sqrt {\frac {a}{b}}}={\frac {\sqrt {a}}{\sqrt {b}}}$
$({\sqrt {a}}+{\sqrt {b}})({\sqrt {a}}-{\sqrt {b}})=a-b$

$(a+{\sqrt {b}})(a-{\sqrt {b}})=a^{2}-b$
$({\sqrt {a}}+{\sqrt {b}})({\sqrt {c}}+{\sqrt {d}})={\sqrt {ac}}+{\sqrt {ad}}+{\sqrt {bc}}+{\sqrt {bd}}$
$({\sqrt {a}}+{\sqrt {b}})^{2}=a+2{\sqrt {ab}}+b$

गणितीय संक्रियाएँ क्या हैं?

चार मूल गणितीय संक्रियाएँ जोड़ ( $+$ ), घटाव ( $-$ ), गुणा ( $\times$ ) और भाग ( $/$ ) हैं।

दो परिमेय संख्याओं पर संक्रियाएँ

ये कुछ संक्रियाएँ हैं:

दो परिमेय संख्याओं का योग

When two rational numbers are added, the result is a rational number. For example, $0.24+0.68=0.92$ . $0.92$ can be written as ${\frac {92}{100}}$ , which is a ratio or the ${\frac {p}{q}}$ form.

दो परिमेय संख्याओं का घटाव

When two rational numbers are subtracted, the result is a rational number. For example, $0.93-0.22=0.71$ which can be written as ${\frac {71}{100}}$ .

दो परिमेय संख्याओं का गुणन

When two rational numbers are multiplied, the result is a rational number. For example, $0.5$ multiplied by $185$ is $92.5$ , which can be written as ${\frac {925}{10}}$ .

दो परिमेय संख्याओं का विभाजन

When a rational number is divided by another rational number, the result is a rational number. For example, $0.352$ divided by $0.6$ is $0.58$ , which can be written as ${\frac {58}{100}}$ .

दो अपरिमेय संख्याओं पर संक्रियाएँ

दो अपरिमेय संख्याओं का योग

When two irrational numbers are added, the result can be an irrational or a rational number. For example, ${\sqrt {3}}$ added to ${\sqrt {3}}$ is $2{\sqrt {3}}$ which can which is a rational number. However, when $2{\sqrt {5}}$ is added to $5{\sqrt {3}}$ , we get a non-terminating and non-recurring decimal, an irrational number. It is written as $2{\sqrt {5}}+5{\sqrt {3}}$ .

दो अपरिमेय संख्याओं का घटाव

Similarly, when two irrational numbers are subtracted, the result can be an irrational or a rational number. ${\sqrt {2}}$ is subtracted from ${\sqrt {2}}$ , the answer is $0$ . When $4{\sqrt {5}}$ is subtracted from $5{\sqrt {3}}$ , we get $5{\sqrt {3}}-4{\sqrt {5}}$ .

दो अपरिमेय संख्याओं का गुणन

The product of two irrational numbers can be an irrational number or a rational number. For example, when ${\sqrt {2}}$ is multiplied by ${\sqrt {2}}$ , we get $2$ which is a rational number. However, when ${\sqrt {2}}$ is multiplied by ${\sqrt {3}}$ , we get ${\sqrt {6}}$ which is an irrational number.

दो अपरिमेय संख्याओं का विभाजन

Similar to multiplication, we can get either an irrational number or a rational number as a result when an irrational number is divided by another. For example, when ${\sqrt {2}}$ is divided by ${\sqrt {2}}$ , we get $1$ which is a rational number. But when ${\sqrt {2}}$ is divided by ${\sqrt {3}}$ , we get ${\frac {\sqrt {2}}{\sqrt {3}}}$ , which is an irrational number.

परिमेय और अपरिमेय संख्या पर संक्रियाएँ

परिमेय और अपरिमेय संख्या का योग

The sum of a rational and an irrational number is always irrational. For example, when $2$ is added to $5{\sqrt {3}}$ , we get $2+5{\sqrt {3}}$ , which is a rational number.

परिमेय और अपरिमेय संख्या का घटाव

The difference between a rational and an irrational number is always irrational. For example, when we subtract $5{\sqrt {3}}$ from $2$ , we get $2-5{\sqrt {3}}$ , which is irrational.

परिमेय और अपरिमेय संख्या का गुणन

The product of a rational and an irrational number might be rational or irrational. For example, when $2$ is multiplied by ${\sqrt {2}}$ , we get $2{\sqrt {2}}$ which is an irrational number, but when ${\sqrt {12}}$ is multiplied by ${\sqrt {3}}$ , we get ${\sqrt {36}}$ , or $6$ , which is a rational number.

परिमेय और अपरिमेय संख्या का विभाजन

When a rational number is divided by an irrational number or vice versa, the quotient is always an irrational number. For example, when $8$ is divided by ${\sqrt {2}}$ , we get ${\frac {8}{\sqrt {2}}}$ , which is an irrational number. The answer can be further simplified to $4{\sqrt {2}}$ which is also an irrational number.

उदाहरण

1. $({\sqrt {11}}+{\sqrt {7}})({\sqrt {11}}-{\sqrt {b}})$

$11-7=4$

2. $({\sqrt {3}}+{\sqrt {7}})^{2}$

$({\sqrt {3}})^{2}+2({\sqrt {3}})({\sqrt {7}})+({\sqrt {7}})^{2}$

$3+2({\sqrt {21}})+7$

$10+2({\sqrt {21}})$

3. $(5+{\sqrt {7}})(2+{\sqrt {5}})$

$10+5{\sqrt {5}}+2{\sqrt {7}}+{\sqrt {35}}$

4. $({\sqrt {7}}+{\sqrt {5}})({\sqrt {7}}-{\sqrt {5}})$

$({\sqrt {7}})^{2}-({\sqrt {5}})^{2}$

$7-5=2$

@@ Line 1: / Line 1: @@
-Here we will be learning operations on [[Real Numbers]].
+यहां हम [[वास्तविक संख्याएँ|वास्तविक संख्याओं]] पर संक्रियाओं की विधि को सीखेंगे।
 == वास्तविक संख्याओं पर संक्रियाओं का नियम ==
@@ Line 15: / Line 15: @@
 * <math>(\sqrt{a} +\sqrt{b})^2=a+2\sqrt{ab}+b</math>
+== गणितीय संक्रियाएँ क्या हैं? ==
+चार मूल गणितीय संक्रियाएँ जोड़ (<math>+</math>), घटाव (<math>-</math>), गुणा (<math>\times</math>) और भाग (<math>/</math>) हैं।
-=== What are Mathematical Operations? ===
+== दो परिमेय संख्याओं पर संक्रियाएँ ==
-The four basic Mathematical operations are addition (<math>+</math>), subtraction (<math>-</math>), multiplication (<math>\times</math>), and division (<math>/</math>).
+ये कुछ संक्रियाएँ हैं:
-== Operations on Two Rational Numbers ==
+=== दो परिमेय संख्याओं का योग ===
-These are some of the operations:
-=== Addition of Two Rational Numbers ===
 When two rational numbers are added, the result is a rational number. For example, <math>0.24+0.68=0.92</math>. <math>0.92</math> can be written as <math>\frac{92}{100}</math>, which is a ratio or the <math>\frac{p}{q}</math> form.
-=== Subtraction of Two Rational Numbers ===
+=== दो परिमेय संख्याओं का घटाव ===
 When two rational numbers are subtracted, the result is a rational number. For example, <math>0.93-0.22=0.71</math> which can be written as <math>\frac{71}{100}</math>.
-=== Multiplication of Two Rational Numbers ===
+=== दो परिमेय संख्याओं का गुणन ===
 When two rational numbers are multiplied, the result is a rational number. For example, <math>0.5</math> multiplied by <math>185</math> is <math>92.5</math>, which can be written as <math>\frac{925}{10}</math>.
-=== Division of Two Rational Numbers ===
+=== दो परिमेय संख्याओं का विभाजन ===
 When a rational number is divided by another rational number, the result is a rational number. For example, <math>0.352</math> divided by <math>0.6</math> is <math>0.58</math>, which can be written as <math>\frac{58}{100}</math>.
-== Operations on two Irrational Numbers ==
+== दो अपरिमेय संख्याओं पर संक्रियाएँ ==
-=== Addition of Two Irrational Numbers ===
+=== दो अपरिमेय संख्याओं का योग ===
 When two irrational numbers are added, the result can be an irrational or a rational number. For example, <math>\sqrt{3}</math> added to <math>\sqrt{3}</math> is  <math>2\sqrt{3}</math> which can which is a rational number. However, when <math>2\sqrt{5}</math> is added to <math>5\sqrt{3}</math>, we get a non-terminating and non-recurring decimal, an irrational number. It is written as <math>2\sqrt{5}+5\sqrt{3}</math>.
-=== Subtraction of Two Irrational Numbers ===
+=== दो अपरिमेय संख्याओं का घटाव ===
 Similarly, when two irrational numbers are subtracted, the result can be an irrational or a rational number. <math>\sqrt{2}</math> is subtracted from <math>\sqrt{2}</math>, the answer is <math>0</math>. When <math>4\sqrt{5}</math> is subtracted from <math>5\sqrt{3}</math>, we get <math>5\sqrt{3}-4\sqrt{5}</math>.
-=== Multiplication of Two Irrational Numbers ===
+=== दो अपरिमेय संख्याओं का गुणन ===
 The product of two irrational numbers can be an irrational number or a rational number. For example, when <math>\sqrt{2}</math> is multiplied by <math>\sqrt{2}</math>, we get <math>2</math> which is a rational number. However, when <math>\sqrt{2}</math> is multiplied by <math>\sqrt{3}</math>, we get <math>\sqrt{6}</math> which is an irrational number.
-=== Division of Two Irrational Numbers ===
+=== दो अपरिमेय संख्याओं का विभाजन ===
 Similar to multiplication, we can get either an irrational number or a rational number as a result when an irrational number is divided by another. For example, when <math>\sqrt{2}</math> is divided by <math>\sqrt{2}</math>, we get <math>1</math> which is a rational number. But when <math>\sqrt{2}</math> is divided by <math>\sqrt{3}</math>, we get <math>\frac{\sqrt{2}}{\sqrt{3}}</math>, which is an irrational number.
-== Operations on a Rational and an Irrational Number ==
+== परिमेय और अपरिमेय संख्या पर संक्रियाएँ ==
-=== Addition of an Irrational and a Rational Number ===
+=== परिमेय और अपरिमेय संख्या का योग ===
 The sum of a rational and an irrational number is always irrational. For example, when <math>2</math> is added to <math>5\sqrt{3}</math>, we get <math>2+5\sqrt{3}</math>, which is a rational number.
-=== Subtraction of an Irrational and a Rational Number ===
+=== परिमेय और अपरिमेय संख्या का घटाव ===
 The difference between a rational and an irrational number is always irrational. For example, when we subtract <math>5\sqrt{3}</math> from <math>2</math>, we get  <math>2-5\sqrt{3}</math>, which is irrational.
-=== Multiplication of an Irrational and a Rational Number ===
+=== परिमेय और अपरिमेय संख्या का गुणन ===
 The product of a rational and an irrational number might be rational or irrational. For example, when <math>2</math> is multiplied by <math>\sqrt{2}</math>, we get <math>2\sqrt{2}</math> which is an irrational number, but when <math>\sqrt{12}</math>  is multiplied by <math>\sqrt{3}</math>, we get <math>\sqrt{36}</math>, or <math>6</math>, which is a rational number.
-=== Division of an Irrational Number with a Rational Number ===
+=== परिमेय और अपरिमेय संख्या का विभाजन ===
 When a rational number is divided by an irrational number or vice versa, the quotient is always an irrational number. For example, when <math>8</math> is divided by <math>\sqrt{2}</math>, we get <math>\frac{8}{\sqrt{2}}</math>, which is an irrational number. The answer can be further simplified to  <math>4\sqrt{2}</math> which is also an irrational number.
-== Examples ==
-.<math>(\sqrt{11} +\sqrt{7})(\sqrt{11} -\sqrt{b})</math>
-<math>11-7=4</math>
-.<math>(\sqrt{3} +\sqrt{7})^2 </math>
-<math>(\sqrt{3})^2 +2(\sqrt{3})(\sqrt{7})+(\sqrt{7})^2 </math>
-<math>3 +2(\sqrt{21})+7 </math>
-<math>10 +2(\sqrt{21}) </math>
-. <math>(5+\sqrt{7})(2 +\sqrt{5})</math>
-<math>10 + 5\sqrt{5}+2\sqrt{7}+\sqrt{35}</math>
-.<math>(\sqrt{7} +\sqrt{5})(\sqrt{7} -\sqrt{5})</math>
-<math>(\sqrt{7})^2 - (\sqrt{5})^2</math>
-<math>7-5=2</math>
-यहां हम वास्तविक संख्याओं पर संक्रियाओं की विधि को सीखेंगे।
-== वास्तविक संख्याओं पर संक्रियाओं का नियम ==
-* एक परिमेय संख्या और अपरिमेय संख्या का योग या अंतर अपरिमेय होता है।
-* अपरिमेय संख्या के साथ एक गैर-शून्य परिमेय संख्या का गुणनफल या भागफल अपरिमेय संख्या होती है।
-* जब दो अपरिमेय संख्याओं को जोड़ा, घटाया, गुणा या विभाजित किया जाता है, तो परिणाम एक परिमेय या अपरिमेय संख्या हो सकती है।
-यदि <math>a </math> और <math>b</math> धनात्मक वास्तविक संख्याएँ हैं, तो हमारे पास है,
-* <math>\sqrt{ab}=\sqrt{a}\sqrt{b}</math>
-* <math>\sqrt{\frac{a}{b}}=\frac{\sqrt{a}}{\sqrt{b}}</math>
-* <math>(\sqrt{a} +\sqrt{b})(\sqrt{a} -\sqrt{b})=a-b</math>
-* <math>(a+\sqrt{b})(a -\sqrt{b})=a^2-b</math>
-* <math>(\sqrt{a}+\sqrt{b})(\sqrt{c} +\sqrt{d})=\sqrt{ac}+\sqrt{ad}+\sqrt{bc}+\sqrt{bd}</math>
-* <math>(\sqrt{a} +\sqrt{b})^2=a+2\sqrt{ab}+b</math>
 == उदाहरण ==