CBSE BOARD X, asked by andrea76, 1 month ago

Complete the question.

Father:
Age: 41
Job/Work: Construction Worker
Activities involved in relation to Construction Worker?
HRF component involved?
Household Chores?
HRF component involved?

Mother:
Age: 41
Job/Work: Vendor
Activities involved in relation to Vendor?
HRF component involved?
Household Chores?
HRF component involved?

Brother:
Age: 17
Job/Work: Student
Activities involved in relation to Students?
HRF component involved?
Household Chores?
HRF component involved?

Sister 1:
Age: 14
Job/Work: Student
Activities involved in relation to Students?
HRF component involved?
Household Chores?
HRF component involved?

Sister 2:
Age: 7
Job/Work: Student
Activities involved in relation to Students?
HRF component involved?
Household Chores?
HRF component involved?​

Answers

Answered by yashchauhan786
0

Answer:

ok

Explanation:

The diagonal of a rectangle is 13cm.

Step-by-step explanation:

Consider the provided information.

It is given that, the length of a rectangle is 12cm and the breadth of a rectangle is 5cm.

And we need to find out the diagonal of a rectangle.

As we know that, the diagonal of a rectangle is always greater then other two sides. i.e.,

In a rectangle, The square of diagonal side of rectangle is equal to the sum of squares of the other two sides.

We know that,

Diagonal = √[(Length)² + (Breadth)²].

By using the formula and substituting all the given values in the formula, we get.

= \sqrt{ {(12)}^{2} + {(5)}^{2} }=

(12)

2

+(5)

2

= \sqrt{144 + {(5)}^{2} }=

144+(5)

2

= \sqrt{144 + 25}=

144+25

= \sqrt{169}=

169

= 13=13

Hence, the diagonal of a rectangle of 13cm.

#Learn more:

The length of rectangle is 5 cm more than its breadth if the perimeter of the rectangle is 3 find the length and breadth of the rectangle.

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