$CATEGORY: Maths - TicTacLearn/14. How Big? How Heavy?

//Multiple Choice(10)

What is the volume of each compass box used by Babban?
{
~ \(90 cm^3\)
= \(96 cm^3\)
~ \(100 cm^3\)
~ \(120 cm^3\)
}

How many vertical rows are there in the lowest layer of Babban’s shape?
{
~ 3
= 4
~ 2
~ 5
}

How many compass boxes are in the second layer of Babban's shape?
{
~ 16
= 9
~ 4
~ 1
}

What is the total number of compass boxes used by Babban to make his shape?
{
~ 25
~ 28
= 30
~ 32
}

What will be the total volume of Babban’s shape?
{
~ \(2400 cm^3\)
= \(2880 cm^3\)
~ \(3000 cm^3\)
~ \(3200 cm^3\)
}

How many layers are there in the shape made by Babban?
{
~ 2
~ 3
= 4
~ 5
}

What was the length of one juice carton used in Champapur?
{
~ 4 cm
= 10 cm
~ 3 cm
~ 6 cm
}

What was the height of each juice carton?
{
~ 2 cm
= 3 cm
~ 5 cm
~ 6 cm
}

What is the total volume of one juice carton?
{
~ \(100 cm^3\)
= \(120 cm^3\)
~ \(140 cm^3\)
~ \(160 cm^3\)
}

Who was declared the winner in Champapur's juice box contest?
{
~ Appu only
~ Bhola only
= Both Appu and Bhola
~ Neither of them
}

How many juice cartons did Appu use to make his shape?
{
~ 40
= 50
~ 60
~ 70
}

What shape did Babban think would attract people to his shop?
{
~ Cylindrical
= A beautiful shape made from compass boxes
~ Spherical
~ Rectangular boxes
}

What was the prize for making the highest-volume shape in Champapur?
{
~ Cash
= Shared reward
~ Trophy
~ New cartons
}

The bottom layer of each juice box has an area of ________.
{
= \(40 cm^2\)
~ \(50 cm^2\)
~ \(60 cm^2\)
~ \(80 cm^2\)
}

Why did Babban’s sales increase?
{
~ He offered discounts
= He made attractive shapes using compass boxes
~ He changed his shop location
~ He reduced prices
}

//True or False(10)

The volume of a single juice carton is \(120 cm^3\). {T}

The total volume of Babban’s shape is \(3000 cm^3\). {F}

The shape created by Babban has four layers. {T}

The width of a juice carton is 5 cm. {F}

Both Appu and Bhola used 50 juice cartons each. {T}

Babban used 25 compass boxes to create his shape. {F}

The height of a single juice carton is 3 cm. {T}

Taru the Frog declared Appu the sole winner. {F}

The bottom area of a juice box is 40 square cm. {T}

The lowest layer in Babban’s shape has 9 compass boxes. {F}

//Fill in the blanks (10)

The volume of each compass box is ________.
{
= \(96 cm^3\)
~ \(120 cm^3\)
~ \(100 cm^3\)
~ \(80 cm^3\)
}

The total volume of the shape made by Babban is ________.
{
= \(2880 cm^3\)
~ \(3000 cm^3\)
~ \(2400 cm^3\)
~ \(2500 cm^3\)
}

In the second layer of Babban’s shape, there are ________ compass boxes.
{
= 9
~ 16
~ 4
~ 1
}

Each juice carton in Champapur has a volume of ________.
{
= \(120 cm^3\)
~ \(100 cm^3\)
~ \(140 cm^3\)
~ \(160 cm^3\)
}

Bhola used ________ juice cartons to make his shape.
{
= 50
~ 60
~ 40
~ 70
}

The width of one juice carton is ________.
{
= 4 cm
~ 3 cm
~ 5 cm
~ 6 cm
}

The lowest layer of Babban’s shape has ________ compass boxes.
{
= 16
~ 9
~ 4
~ 1
}

Taru the Frog explained that the bottom layer of each juice box is ________ square cm.
{
= 40
~ 50
~ 60
~ 70
}

The prize for Champapur’s contest was shared between ________.
{
= Appu and Bhola
~ Appu and Taru
~ Bhola and Taru
~ Babban and Bhola
}

The height of the juice cartons is ________.
{
= 3 cm
~ 4 cm
~ 5 cm
~ 6 cm
}

//Numericals (10)

If the height of a juice box is doubled, what will be the new volume?
{
~ \(120 cm^3\)
= \(240 cm^3\)
~ \(300 cm^3\)
~ \(360 cm^3\)
}

What is the total volume if 60 juice boxes are used?
{
= \(7200 cm^3\)
~ \(6000 cm^3\)
~ \(8400 cm^3\)
~ \(9600 cm^3\)
}

How many juice cartons are needed to make a volume of \(12,000 cm^3\)?
{
~ 80
= 100
~ 120
~ 150
}

What is the total volume if each compass box has a volume of \(96 cm^3\) and 20 boxes are used?
{
= \(1920 cm^3\)
~ \(2000 cm^3\)
~ \(1800 cm^3\)
~ \(2400 cm^3\)
}

If the width of a juice box is increased to 8 cm, what will be its volume?
{
~ \(240 cm^3\)
= \(360 cm^3\)
~ \(480 cm^3\)
~ \(600 cm^3\)
}

//Match the Following(1)

Match the following items from Column A with their correct corresponding options from Column B:
{
=Volume of one compass box -> 96 cm^3
=Number of compass boxes -> 30
=Width of juice carton -> 4 cm
=Height of juice carton -> 3 cm
=Total volume of Babban’s shape -> 2880 cm^3
}

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