Math, asked by vijay12214, 1 year ago

The effective rate of interest for one year corresponding to a nominal at 7% rate of interest per annumconvertible quarterly is​

Answers

Answered by GauravSaxena01
21

Solution:-

The effective rate of interest for one year corresponding to a nominal at 7% rate of interest per annumconvertible quarterly is

====================

Given

r = 7%

p.a i.e 1.75% per quarter(7/4).

so 1+reff = (1.0175)^4

= 1.071859

Implies reff = 7.1859

interest per annumconvertible quarterly is 7.1859

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@GauravSaxena01

Answered by Anonymous
1

Step-by-step explanation:

Question:-

the length of a rectangle is 8m more than its breadth if its perimeter is 128m, find its length , breadth and Area

Answer:-

The length of Rectangle is 36 m

The breadth of rectangle is 28 m

The area of Given rectangle is 1008 m².

To find:-

Length and breadth of rectangle

Area of rectangle

Solution:-

Let the breadth be x

Length = 8 + x

Perimeter = 128 m

\boxed{ \large{ \mathfrak{perimeter = 2(l + b)}}}

According to question,

\large{ \tt: \implies \: \: \: \: \: 2(8 + x + x) = 128}

\begin{gathered} \large{ \tt: \implies \: \: \: \: \: 8 + 2x = \frac{128}{2} } \\ \end{gathered}:

\large{ \tt: \implies \: \: \: \: \: 8 + 2x = 64}

\large{ \tt: \implies \: \: \: \: \: 2x = 64 - 8}

\large{ \tt: \implies \: \: \: \: \: 2x = 56}

\large{ \tt: \implies \: \: \: \: \: x = 28}

The breadth of rectangle is 28 m

Length = 8 + x = 28 + 8 = 36 m

\large{ \boxed{ \mathfrak{area = l \times b}}}

\large{ \tt: \implies \: \: \: \: \: area = 28\times 36}

\large{ \tt: \implies \: \: \: \: \: area = 1008 \: {m}^{2} }

Question:-

the length of a rectangle is 8m more than its breadth if its perimeter is 128m, find its length , breadth and Area

Answer:-

The length of Rectangle is 36 m

The breadth of rectangle is 28 m

The area of Given rectangle is 1008 m².

To find:-

Length and breadth of rectangle

Area of rectangle

Solution:-

Let the breadth be x

Length = 8 + x

Perimeter = 128 m

\boxed{ \large{ \mathfrak{perimeter = 2(l + b)}}}

According to question,

\large{ \tt: \implies \: \: \: \: \: 2(8 + x + x) = 128}

\begin{gathered} \large{ \tt: \implies \: \: \: \: \: 8 + 2x = \frac{128}{2} } \\ \end{gathered}:

\large{ \tt: \implies \: \: \: \: \: 8 + 2x = 64}

\large{ \tt: \implies \: \: \: \: \: 2x = 64 - 8}

\large{ \tt: \implies \: \: \: \: \: 2x = 56}

\large{ \tt: \implies \: \: \: \: \: x = 28}

The breadth of rectangle is 28 m

Length = 8 + x = 28 + 8 = 36 m

\large{ \boxed{ \mathfrak{area = l \times b}}}

\large{ \tt: \implies \: \: \: \: \: area = 28\times 36}

\large{ \tt: \implies \: \: \: \: \: area = 1008 \: {m}^{2} }

The area of Given rectangle is 1008 m².

The area of Given rectangle is 1008 m².

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