Question

# If

- 2
- 3
- 4
- –2

## The correct answer is: 4

### To find the value of z

Hence option 3 is correct

### Related Questions to study

### If

Hence option 2 is correct

### If

Hence option 2 is correct

### The appropriate formula that can be used to find the value of

Hence option 3 is correct

### The appropriate formula that can be used to find the value of

Hence option 3 is correct

### Divide

Hence option 1 is correct

### Divide

Hence option 1 is correct

### Find the missing term in

Hence option 2 is correct

### Find the missing term in

Hence option 2 is correct

### Find the probability of getting a number less than 5 in a single throw of a die

Hence option 2 is correct

### Find the probability of getting a number less than 5 in a single throw of a die

Hence option 2 is correct

### In the spinner shown, pointer can land on any of three parts of the same size. So there are three outcomes. What part of the whole is coloured?

So here we used the concept of fractions to understand the question. The numerical numbers that make up a fraction of the whole are called fractions. A whole can be a single item or a collection of items. When anything or a number is divided into equal parts, each piece represents a portion of the total. So the fraction in this question is 1/3.

### In the spinner shown, pointer can land on any of three parts of the same size. So there are three outcomes. What part of the whole is coloured?

So here we used the concept of fractions to understand the question. The numerical numbers that make up a fraction of the whole are called fractions. A whole can be a single item or a collection of items. When anything or a number is divided into equal parts, each piece represents a portion of the total. So the fraction in this question is 1/3.

### A box contains 4 packs of chocolates. Anusha picks out a pack at random. What is the probability that she picks

A) Perk?

B) Kitkat?

Here we used the concept of probability to find the answer using events. A set of results from an experiment might be referred to as a probability event. In other words, a probability definition of an event is the subset of the relevant sample space. So the probabilities are .

### A box contains 4 packs of chocolates. Anusha picks out a pack at random. What is the probability that she picks

A) Perk?

B) Kitkat?

Here we used the concept of probability to find the answer using events. A set of results from an experiment might be referred to as a probability event. In other words, a probability definition of an event is the subset of the relevant sample space. So the probabilities are .

### In which class interval of wages there are less number of workers?

Hence option 4 is correct

### In which class interval of wages there are less number of workers?

Hence option 4 is correct

### What is the size of the class?

Hence option 1 is correct

### What is the size of the class?

Hence option 1 is correct

### What is the lowest value of rainfall?

Hence option 3 is corrrect

### What is the lowest value of rainfall?

Hence option 3 is corrrect

### In a Parallelogram the diagonals intersect at O. If then AC is

Hence option 4 is correct

### In a Parallelogram the diagonals intersect at O. If then AC is

Hence option 4 is correct

### ABCD is a Parallelogram. If

### ABCD is a Parallelogram. If

### ABCD is a Quadrilateral in which

### ABCD is a Quadrilateral in which

### PQRS is a Quadrilateral in which

### PQRS is a Quadrilateral in which

### PQRS is a Quadrilateral in which

So here we used the concept of a quadrilateral to understand the question. It is basically 4 sided shape that can take any figure. We also used the angle sum property of a quadrilateral which is 360 degrees. So here the angle R + S is 180 degrees.

### PQRS is a Quadrilateral in which

So here we used the concept of a quadrilateral to understand the question. It is basically 4 sided shape that can take any figure. We also used the angle sum property of a quadrilateral which is 360 degrees. So here the angle R + S is 180 degrees.