(i) Given, Squaring both sides, we get Hence, = 2. (ii) Squaring both sides, we get Hence, = 2.

Mathematics

If $a + \dfrac{1}{a} = 2$ ; find :
(i) $\dfrac{a^4 + 1}{a^2}$
(ii) $\dfrac{a^8 + 1}{a^4}$

Expansions

1 Like

Answer

(i) Given, $a + \dfrac{1}{a} = 2$

Squaring both sides, we get

$⇒ \Big(a + \dfrac{1}{a}\Big)^2 = (2)^2\\[1em] ⇒ a^2 + \dfrac{1}{a^2} + 2 \times a \times \dfrac{1}{a} = 4\\[1em] ⇒ a^2 + \dfrac{1}{a^2} + 2 = 4\\[1em] ⇒ a^2 + \dfrac{1}{a^2} = 4 - 2\\[1em] ⇒ a^2 + \dfrac{1}{a^2} = 2\\[1em] ⇒ \dfrac{a^4 + 1}{a^2} = 2\\[1em]$

Hence, $\dfrac{a^4 + 1}{a^2}$ = 2.

(ii) $a^2 + \dfrac{1}{a^2} = 2$

Squaring both sides, we get

$⇒ \Big(a^2 + \dfrac{1}{a^2}\Big)^2 = (2)^2\\[1em] ⇒ a^4 + \dfrac{1}{a^4} + 2 \times a^2 \times \dfrac{1}{a^2} = 4\\[1em] ⇒ a^4 + \dfrac{1}{a^4} + 2 = 4\\[1em] ⇒ a^4 + \dfrac{1}{a^4} = 4 - 2\\[1em] ⇒ a^4 + \dfrac{1}{a^4} = 2\\[1em] ⇒ \dfrac{a^8 + 1}{a^4} = 2\\[1em]$

Hence, $\dfrac{a^8 + 1}{a^4}$ = 2.

Answered By

1 Like

Mathematics

If $a + \dfrac{1}{a} = 2$ ; find :
(i) $\dfrac{a^4 + 1}{a^2}$
(ii) $\dfrac{a^8 + 1}{a^4}$

Expansions

Answer

Related Questions

The difference between the compound interest and the simple interest accrued on an amount of ₹ 18,000 in 2 years is ₹ 405. Find the rate of interest per annum.

The cost of a car, purchased 2 years ago, depreciates at the rate of 20% per year. If its present value is ₹ 3,15,600; find :
(i) its value after 2 years.
(ii) its value, when it was purchased 2 years ago.

If $a-\dfrac{1}{a} = 3$ ; find : $a^2 + 3a +\dfrac{1}{a^2} - \dfrac{3}{a}$ .

If a + b = 4 and ab = 3; find $\dfrac{1}{b^2} + \dfrac{1}{a^2}$

Mathematics

If a+1a=2a + \dfrac{1}{a} = 2a+a1​=2; find :(i) a4+1a2\dfrac{a^4 + 1}{a^2}a2a4+1​(ii) a8+1a4\dfrac{a^8 + 1}{a^4}a4a8+1​

Expansions

Answer

Related Questions

The difference between the compound interest and the simple interest accrued on an amount of ₹ 18,000 in 2 years is ₹ 405. Find the rate of interest per annum.

The cost of a car, purchased 2 years ago, depreciates at the rate of 20% per year. If its present value is ₹ 3,15,600; find :(i) its value after 2 years.(ii) its value, when it was purchased 2 years ago.

If a−1a=3a-\dfrac{1}{a} = 3a−a1​=3; find : a2+3a+1a2−3aa^2 + 3a +\dfrac{1}{a^2} - \dfrac{3}{a}a2+3a+a21​−a3​ .

If a + b = 4 and ab = 3; find 1b2+1a2\dfrac{1}{b^2} + \dfrac{1}{a^2}b21​+a21​

If $a + \dfrac{1}{a} = 2$ ; find :
(i) $\dfrac{a^4 + 1}{a^2}$
(ii) $\dfrac{a^8 + 1}{a^4}$

The cost of a car, purchased 2 years ago, depreciates at the rate of 20% per year. If its present value is ₹ 3,15,600; find :
(i) its value after 2 years.
(ii) its value, when it was purchased 2 years ago.

If $a-\dfrac{1}{a} = 3$ ; find : $a^2 + 3a +\dfrac{1}{a^2} - \dfrac{3}{a}$ .

If a + b = 4 and ab = 3; find $\dfrac{1}{b^2} + \dfrac{1}{a^2}$