Question

Can you explain these 2 paragraphs : There was a roaring in the wind all night;
The rain came heavily and fell in floods;
But now the sun is rising calm and bright;
The birds are singing in the distant woods;
Over his own sweet voice the Stock-dove broods;
The Jay makes answer as the Magpie chatters;
And all the air is filled with pleasant noise of waters.

All things that love the sun are out of doors;
The sky rejoices in the morning's birth;
The grass is bright with rain-drops;—on the moors
The hare is running races in her mirth;
And with her feet she from the plashy earth
Raises a mist, that, glittering in the sun,
Runs with her all the way, wherever she doth run.

Answer 1

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Answer 2

Explanation:

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Probability

The Probability of an event is calculated with the simple logical formula:

$\textsf{Probability of an event} = \dfrac{\textsf{Number of favourable occurences of event}}{\textsf{Total number of possible events}}$

Here, the Bar Graph shows the data in Crayonton. The data in tabular format is this:

$\begin{tabular}{|c|c|}\cline{1-2}\tt Weather Condition &\tt Number of days \\\cline{1-2}\sf Sunny & \sf 3 \\\sf Cloudy & \sf 5 \\\sf Rainy & \sf 2 \\ \sf Snowy & \sf 2 \\ \cline{1-2}\end{tabular}$

Suppose Event A is that it is Sunny tomorrow in Crayonton. We make this prediction based on the past data.

First, we need the total number of events.

Total Number of Events = 3 Sunny + 5 Cloudy + 2 Rainy + 2 Snowy = 12 Events

Thus, Total Number of Events is 12.

Out of that, the number of favourable events, which is Sunny in our case, are 3.

So, Number of favourable occurrences of Event A = 3

This is simply because there have been 3 Sunny Days out of 12.

So, Probability of Event A, denoted as P(A), is:

$\sf P(A) = \dfrac{3}{12} = \dfrac{1}{4} \\\\\\ \implies \sf P(A) = \dfrac{1}{4} \times 100\ \% \\\\\\ \implies \Large\boxed{\sf P(A) = 25\ \%}$

Thus,

The Probability that it will be sunny tomorrow in Crayonton is (d) 25 %