NCERT Solutions: Class 9 Maths Chapter 3 - The World of Numbers

For every 2 bags, he receives 15 ingots. Since $12 \div 2=6$, 12 bags make 6 such groups. Therefore the number of ingots is $6\times 15=90$.

Each of $11,13,17,19$ has exactly two positive factors: 1 and itself. Continuing the prime-number pattern after 19 gives $23,29,31$.

A set is closed under an operation only if applying the operation to any two members always gives a member of the same set. Subtraction of natural numbers can give a negative number or 0, so natural numbers are not closed under subtraction.

The thumb acts as the pointer. The other four fingers each have 3 countable joints, so the total is $3+3+3+3=12$. Because one full hand-count gives 12, larger counts can be grouped by twelves.

A drop of $15$ °C from $4$ °C gives $4-15=-11$. Therefore the temperature is $-11$ °C.

Represent debt/loss as negative and profit as positive. Then the final amount is $-850+1200-450=350-450=-100$. A negative result means he is still in debt by `100.

A negative times a positive is negative, so $(-12)\times 5=-60$. A negative times a negative is positive, so $(-8)\times(-7)=56$. Subtracting a negative adds the positive: $0-(-14)=14$. A negative divided by a positive is negative: $(-20)\div 4=-5$.

Think of $-5$ as owing `5. Subtracting $-5$ means taking away that debt. Taking away a debt improves the balance by the same amount, so it has the same effect as adding $+5$.

Reduce each fraction by dividing numerator and denominator by their common factor: $4/6$ by 2, $10/8$ by 2, and $-6/10$ by 2. Also $9\div 3=3$. Hence each pair represents the same rational number.

(i) $\dfrac{2}{5}+\dfrac{3}{10}=\dfrac{4}{10}+\dfrac{3}{10}=\dfrac{7}{10}$. (ii) $\dfrac{7}{12}+\dfrac{5}{8}=\dfrac{14}{24}+\dfrac{15}{24}=\dfrac{29}{24}$. (iii) $-\dfrac{4}{7}+\dfrac{3}{14}=-\dfrac{8}{14}+\dfrac{3}{14}=-\dfrac{5}{14}$.

(i) $\dfrac{5}{6}-\dfrac{1}{4}=\dfrac{10}{12}-\dfrac{3}{12}=\dfrac{7}{12}$. (ii) $\dfrac{11}{8}-\dfrac{3}{4}=\dfrac{11}{8}-\dfrac{6}{8}=\dfrac{5}{8}$. (iii) $-\dfrac{7}{9}-\left(-\dfrac{2}{3}\right)=-\dfrac{7}{9}+\dfrac{6}{9}=-\dfrac{1}{9}$.

Multiply numerators and denominators, then simplify: $\dfrac{2}{3}\times\dfrac{3}{10}=\dfrac{6}{30}=\dfrac{1}{5}$; $\dfrac{7}{11}\times\dfrac{5}{8}=\dfrac{35}{88}$; $-\dfrac{4}{7}\times\dfrac{5}{14}=-\dfrac{20}{98}=-\dfrac{10}{49}$.

Divide by multiplying by the reciprocal: $\dfrac{2}{3}\div\dfrac{3}{10}=\dfrac{2}{3}\times\dfrac{10}{3}=\dfrac{20}{9}$; $\dfrac{7}{11}\div\dfrac{5}{8}=\dfrac{7}{11}\times\dfrac{8}{5}=\dfrac{56}{55}$; $-\dfrac{4}{7}\div\dfrac{5}{14}=-\dfrac{4}{7}\times\dfrac{14}{5}=-\dfrac{8}{5}$.

LHS $=\left(\dfrac{1}{2}+\dfrac{3}{4}\right)\times\dfrac{8}{3}=\left(\dfrac{2}{4}+\dfrac{3}{4}\right)\times\dfrac{8}{3}=\dfrac{5}{4}\times\dfrac{8}{3}=\dfrac{10}{3}$. RHS $=\dfrac{1}{2}\times\dfrac{8}{3}+\dfrac{3}{4}\times\dfrac{8}{3}=\dfrac{4}{3}+2=\dfrac{10}{3}$. Hence LHS = RHS.

Using the distributive property, $\dfrac{7}{9}\left(\dfrac{6}{7}-\dfrac{3}{4}\right)=\dfrac{7}{9}\times\dfrac{6}{7}-\dfrac{7}{9}\times\dfrac{3}{4}=\dfrac{2}{3}-\dfrac{7}{12}=\dfrac{8}{12}-\dfrac{7}{12}=\dfrac{1}{12}$.

Expand the left side: $\dfrac{5}{6}\left(x+\dfrac{3}{5}\right)=\dfrac{5}{6}x+\dfrac{5}{6}\times\dfrac{3}{5}=\dfrac{5}{6}x+\dfrac{1}{2}$. This is exactly the right side, so the equation is an identity true for all rational $x$.

Divide the unit from 0 to 1 into 3 equal parts and mark the second part for $2/3$. Since $-5/4=-1\dfrac{1}{4}$, mark it one-fourth unit to the left of $-1$. Since $11/2=5\dfrac{1}{2}$, mark it halfway between 5 and 6.

The numbers satisfy $-\dfrac{1}{2}\lt -\dfrac{1}{4}\lt 0\lt \dfrac{1}{8}\lt \dfrac{1}{4}$, so all three lie strictly between the given rational numbers.

$-\dfrac{1}{4}+\dfrac{5}{12}=-\dfrac{3}{12}+\dfrac{5}{12}=\dfrac{2}{12}=\dfrac{1}{6}$.

$15\dfrac{3}{4}=\dfrac{63}{4}$ and $2\dfrac{1}{4}=\dfrac{9}{4}$. Number of kurtas $=\dfrac{63}{4}\div\dfrac{9}{4}=\dfrac{63}{4}\times\dfrac{4}{9}=7$.

Each of these terminating decimals is rational, and each is greater than $3.1415$ but less than $3.1416$.

Since rational numbers are closed under addition and division by the non-zero integer 2, $\dfrac{a+b}{2}$ is rational. Also, if $a\lt b$, then $a\lt \dfrac{a+b}{2}\lt b$. Repeating this method gives as many rational numbers as needed.

A rational number in lowest form has a terminating decimal if its denominator has only factors 2 and/or 5. Here $20=2^2\times 5$, so $7/20$ terminates. $15=3\times 5$ has factor 3, so $4/15$ repeats. $250=2\times 5^3$, so $13/250$ terminates. Long division gives $0.35$, $0.2666\ldots$ and $0.052$ respectively.

Long division gives remainders that repeat after 6 steps for $1/13$, producing $076923$. Multiplying $1/13$ by 2, 3, 4, ... gives the decimal blocks for $2/13,3/13,4/13,\ldots$. Several are rotations of one another, showing cyclic behaviour in the repeating parts.

Perfect-square roots and terminating or repeating decimals are rational. Thus $\sqrt{81}=9$, $0.333\ldots$ repeats, $0.1234512345\ldots$ repeats the block 12345, and the finite decimal in (vi) is rational. $\sqrt{12}=2\sqrt3$ is irrational because $\sqrt3$ is irrational. The decimal in (v) does not repeat a fixed block, so it is irrational.

Let $x=0.\overline{9}=0.999\ldots$. Then $10x=9.999\ldots$. Subtracting, $10x-x=9.999\ldots-0.999\ldots=9$, so $9x=9$ and $x=1$. Therefore $0.\overline{9}=1$.

Such denominators are examples where the decimal repetend of $1/n$ is cyclic under multiplication by suitable integers. Checking by long division for $1/17$ and $1/19$ gives repeating blocks whose multiples produce cyclic rotations.

For $3/50$, make the denominator 100: $\dfrac{3}{50}=\dfrac{6}{100}=0.06$. Long division of $2\div 9$ gives 0 remainder pattern with digit 2 repeating, so $2/9=0.222\ldots=0.\overline{2}$.

Write each terminating decimal over the suitable power of 10 and reduce: $12.6=126/10=63/5$; $0.0120=120/10000=3/250$; $3.052=3052/1000=763/250$; $1.235=1235/1000=247/200$; $0.23=23/100$; $2.05=205/100=41/20$; $2.125=2125/1000=17/8$; $3.125=3125/1000=25/8$; $2.1625=21625/10000=173/80$.

To locate a terminating decimal, divide the appropriate unit interval into equal decimal parts. Mark $0.532$ as 532 thousandths from 0. Mark $1.15$ as 15 hundredths to the right of 1.

These are $3.1,3.2,3.3,3.4,3.5,3.6$, and each lies strictly between 3 and 4.

Write $\dfrac{2}{5}=\dfrac{20}{50}$ and $\dfrac{3}{5}=\dfrac{30}{50}$. Fractions with numerators between 20 and 30 lie between the two given numbers.

Use denominator 30: $\dfrac{1}{6}=\dfrac{5}{30}$ and $\dfrac{2}{5}=\dfrac{12}{30}$. Therefore $6/30,7/30,8/30,9/30,10/30$ lie strictly between them.

$\dfrac{x}{3}+\dfrac{x}{5}=\dfrac{5x+3x}{15}=\dfrac{8x}{15}$. So $\dfrac{8x}{15}=\dfrac{16}{15}$, hence $8x=16$ and $x=2$.

From $a+\dfrac{1}{b}=0$, we get $a=-\dfrac{1}{b}$. Multiplying both sides by $b$ gives $ab=-1$. Therefore $ab$ is negative.

A terminating decimal ending at the 4th decimal place is an integer number of ten-thousandths, so it is $p/10^4$. Since the 4th decimal digit is non-zero and no later non-zero digits occur, $p$ is not divisible by 10. Now $10^4=2^4\times 5^4$. When reducing $p/10^4$, factors common with $p$ may cancel. But because $p$ is not divisible by 10, it cannot contain both a factor 2 and a factor 5 at the same time. Hence at least one full factor $2^4$ or $5^4$ remains in the denominator.

$125=5^3$. A denominator with only factors 2 and 5 gives a terminating decimal. Since $\dfrac{18}{125}=\dfrac{18\times 8}{125\times 8}=\dfrac{144}{1000}=0.144$, it has 3 decimal places.

The denominator is $2^3\times 5$. To make it a power of 10, multiply by $5^2$: $(2^3\times 5)\times 5^2=2^3\times 5^3=10^3$. Therefore the decimal terminates within 3 decimal places.

Using denominator 48 gives many integer numerators strictly between 28 and 40. Any numerator from 29 to 39 gives a rational number between $a$ and $b$; choosing five of them gives the listed answers. In general, if the endpoints are $k_1/m$ and $k_2/m$, the number of integer numerators strictly between them is $k_2-k_1-1$. To find $n$ such rational numbers, we need at least $n$ integer numerators between, so $k_2-k_1-1\ge n$, i.e. $k_2-k_1\ge n+1$. The stronger condition $k_2-k_1>n+1$ also guarantees enough choices.