Math, asked by hmskjwvskMm, 1 month ago

In a triangle the largest angle is 5 degree more than 4 times its smallest angle.The other angle is twice the smallest angle.What are the 3 angles of the triangle…..?​

Answers

Answered by MrUniqueBoi
1

Given: In a triangle, the largest angle is five more than four times its smallest angle. & The other angle is twice the smallest angle.

Need to find: The three angles of ∆?

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❍ Let's say the smaller angle be x. Then, the largest angle and another angle would be (4x + 5) and 2x.

\underline{\bigstar\:{\pmb{\textsf{Angle Sum Property of}}  \: \sf{\Delta} \;:}}\\

The ASP (Angle Sum Property) of the triangle States that the Sum of all angles of the triangle is 180°.

:\implies{\sf{\pmb{\angle A + \angle B + \angle C = 180^\circ}}} \\\\\\

:\implies\sf x + 4x + 5 + 2x = 180^\circ\\\\\\

:\implies\sf 7x + 5 = 180^\circ\\\\\\

:\implies\sf 7x = 180^\circ - 5\\\\\\

:\implies\sf 7x = 175\\\\\\

:\implies\sf x = \cancel\dfrac{175^\circ}{7}\\\\\\

:\implies\underline{\boxed{\pmb{\frak{\purple{x = 25^\circ}}}}}\;\bigstar\\

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\underline{\bf{\dag} \:\mathfrak{Angles\;of\;the\:\Delta\:are\; :}}⠀⠀⠀⠀

x = 25°

(4x + 5) = (4[25] + 5) = 105°

2x = 2(25) = 50°

\therefore{\underline{\sf{Hence, \: the \: angles \: of \:  \Delta \: are \:  \pmb{ 25^\circ, \; 105^\circ,\; 50^\circ} \: respectively.}}}

\huge\mathtt\red{\textsf{MrUniqueBoi}}

Answered by chnaidu1969
0

Step-by-step explanation:

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