Question:
If in a $\triangle$ PQR, sin P, sin Q, sin R are in AP, then
If in a $\triangle$ PQR, sin P, sin Q, sin R are in AP, then
Updated On: Jun 23, 2023
- the altitudes are in AP
- the altitudes are in HP
- the medians are in GP
- the medians are in AP
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The Correct Option is B
Solution and Explanation
By the law of sine rule,
$\frac{a}{ sin \ P } = \frac{b}{ sin \ Q} = \frac{ c}{ sin \ R } = k $ [ say]
Also, $ \frac{1}{2}, ap_1 = \triangle \Rightarrow \frac{ 2 \\triangle }{\alpha} = p_1$
$\Rightarrow p_1 = \frac{2 \triangle }{ k \ sin \ P }$
Similarly, $ p_2 = \frac{ 2 \triangle }{ k \ sin \ Q } \ and \ p_3 = \frac{2 \triangle }{ k \ sin \ R }$
Since, sin P, sin Q and sin R are in AP, hence $p_1, p_2, p_3$
are in HP.
$\frac{a}{ sin \ P } = \frac{b}{ sin \ Q} = \frac{ c}{ sin \ R } = k $ [ say]
Also, $ \frac{1}{2}, ap_1 = \triangle \Rightarrow \frac{ 2 \\triangle }{\alpha} = p_1$
$\Rightarrow p_1 = \frac{2 \triangle }{ k \ sin \ P }$
Similarly, $ p_2 = \frac{ 2 \triangle }{ k \ sin \ Q } \ and \ p_3 = \frac{2 \triangle }{ k \ sin \ R }$
Since, sin P, sin Q and sin R are in AP, hence $p_1, p_2, p_3$
are in HP.
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Concepts Used:
Arithmetic Progression
Arithmetic Progression (AP) is a mathematical series in which the difference between any two subsequent numbers is a fixed value.
For example, the natural number sequence 1, 2, 3, 4, 5, 6,... is an AP because the difference between two consecutive terms (say 1 and 2) is equal to one (2 -1). Even when dealing with odd and even numbers, the common difference between two consecutive words will be equal to 2.
In simpler words, an arithmetic progression is a collection of integers where each term is resulted by adding a fixed number to the preceding term apart from the first term.
For eg:- 4,6,8,10,12,14,16
We can notice Arithmetic Progression in our day-to-day lives too, for eg:- the number of days in a week, stacking chairs, etc.
Read More: Sum of First N Terms of an AP