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Answer:
x =y×x=13 square with bracket on it
Step-by-step explanation:
The partition displaced between 10 and 12 million people along religious lines, creating overwhelming refugee crises in the newly constituted dominions. There was large-scale violence, with estimates of loss of life accompanying or preceding the partition disputed and varying between several hundred thousand and two million.[1][c] The violent nature of the partition created an atmosphere of hostility and suspicion between India and Pakistan that affects their relationship to this day.The Partition of India of 1947 was the division of British India[b] into two independent dominion states, India and Pakistan.[3] The Dominion of India is today the Republic of India; the Dominion of Pakistan is today the Islamic Republic of Pakistan and the People's Republic of Bangladesh. The partition involved the division of two provinces, Bengal and Punjab, based on district-wise non-Muslim or Muslim majorities. The partition also saw the division of the British Indian Army, the Royal Indian Navy, the Indian Civil Service, the railways, and the central treasury. The partition was outlined in the Indian Independence Act 1947 and resulted in the dissolution of the British Raj, or Crown rule in India. The two self-governing countries of India and Pakistan legally came into existence at midnight on 15 August 1947.Given :
The length of AB = 15 cm
The length of AC = 17 cm
To Find :
The length of BC
Solution :
The given triangle is an right angled triangle. So , applying pythogoreas theorem,
Square of the hypotenuse of the right angled triangle is equal to the sum of the squares of other two sides.
In the given right angled triangle ABC,
AC is the hypotenuse {Side opppsite to the right angle}
So ,
\begin{gathered} \\ : \implies \sf \: (AC)^2 = (AB)^2 + (BC)^2 \\ \\ \end{gathered}:⟹(AC)2=(AB)2+(BC)2
\begin{gathered} \\ : \implies \sf \: {(17)}^{2} = {(15)}^{2} + (BC)^2 \\ \\ \end{gathered}:⟹(17)2=(15)2+(BC)2
\begin{gathered} \\ : \implies \sf \: 289 = 225 + (BC)^2 \\ \\ \end{gathered}:⟹289=225+(BC)2
\begin{gathered} \\ : \implies \sf \: 289 - 225 =(BC)^2 \\ \\ \end{gathered}:⟹289−225=(BC)2
\begin{gathered} \\ : \implies \sf \: (BC)^2 = 64 \\ \\ \end{gathered}:⟹(BC)2=64
\begin{gathered} \\ : \implies \sf \: BC = \sqrt{64} \\ \\ \end{gathered}:⟹BC=64
\begin{gathered} \\ : \implies{\underline{\boxed{\pink {\mathfrak{BC = 8 \: cm}}}}} \: \bigstar \\ \\ \end{gathered}:⟹BC=8cm★
Hence ,
The length of the unknown side of the given right angled triangle is 8 cm.