May 2026

Simplest Form of 1.6̅ Simplest Form of \(1.\overline{6}\) Fill in the Blank: The simplest form of \(1.\overline{6}\) is \(\frac{5}{3}\). Explanation: Let \(x = 1.666\ldots\) \[ 10x = 16.666\ldots \] \[ 10x – x = 16.666\ldots – 1.666\ldots \] \[ 9x = 15 \Rightarrow x = \frac{15}{9} = \frac{5}{3} \] Final Answer: \(\frac{5}{3}\) Next Question / […]

Product of Rational and Irrational Number Product of a Rational and an Irrational Number Fill in the Blank: The product of a non-zero rational number with an irrational number is always an irrational number. Explanation: Multiplying any non-zero rational number with an irrational number always results in an irrational number. Example: \[ 2 \times \sqrt{3}

Pi as an Irrational Number \( \pi \) as an Irrational Number Fill in the Blank: \( \pi \) is an irrational number. Explanation: The value of \( \pi \) continues infinitely without repeating, so it cannot be expressed as a fraction. Final Answer: Irrational Next Question / Full Exercise

Recurring Decimal as Rational Number Recurring Decimal as a Rational Number Fill in the Blank: Every recurring decimal is a rational number. Explanation: Recurring decimals repeat a pattern of digits and can always be expressed as a fraction \( \frac{p}{q} \), hence they are rational numbers. Final Answer: Rational Next Question / Full Exercise

Value of 1.999… in p/q Form Value of \(1.999\ldots\) in Fraction Form Fill in the Blank: The value of \(1.999\ldots\) in the form of \( \frac{m}{n} \), where \(m\) and \(n\) are integers and \(n \ne 0\), is 2. Explanation: Let \(x = 1.999\ldots\) \[ 10x = 19.999\ldots \] Subtract: \[ 10x – x =

Decimal Expansion of √2 The Decimal Expansion of \( \sqrt{2} \) Fill in the Blank: The decimal expansion of \( \sqrt{2} \) is non-terminating and non-repeating. Explanation: Since \( \sqrt{2} \) is an irrational number, its decimal expansion continues infinitely and does not repeat. Final Answer: Non-terminating, Non-repeating Next Question / Full Exercise

Decimal Expansion of Irrational Numbers The Decimal Expansion of an Irrational Number Fill in the Blank: The decimal expansion of an irrational number is non-terminating and non-repeating. Explanation: Non-terminating → Decimal never ends Non-repeating → No repeating pattern of digits Final Answer: Non-repeating Next Question / Full Exercise

Decimal Expansion of Rational Numbers The Decimal Expansion of a Rational Number Fill in the Blank: The decimal expansion of a rational number is either terminating or non-terminating repeating. Explanation: Terminating decimal: Ends after a finite number of digits (e.g., \(0.5\)) Non-terminating repeating decimal: Continues forever but repeats (e.g., \(0.\overline{3}\)) Final Answer: Terminating, Non-terminating repeating

Visualise 5.3̅7 on Number Line Visualise \(5.3\overline{7}\) on the Number Line upto 5 Decimal Places Diagram (Successive Magnification) 5 6 5.3 5.3 5.4 5.37 5.37 5.38 5.377 5.377 5.378 5.3777 Construction Method: Step 1: Mark 5 and 6 on the number line. \[ 5 < 5.3777 < 6 \] Step 2: Divide [5, 6] into

Representation of √3.5, √9.4, √10.5 on Number Line Represent \( \sqrt{3.5}, \sqrt{9.4}, \sqrt{10.5} \) on the Number Line Construction Method: Step 1: Draw a number line and mark O (0) and A such that OA = 3.5 units. Step 2: At point A, draw a perpendicular AB of length 1 unit. Step 3: Join OB.