Question

Three consecutive integers and up to 51 what are these integers?​

Answer 1

Answer:

zero

In the given question we can see there is no variable and and a constant that is root 7 is given. For all constants the degree is always zero. Therefore the degree for the polynomial root 7 is "zero

Step-by-step explanation:

zero

In the given question we can see there is no variable and and a constant that is root 7 is given. For all constants the degree is always zero. Therefore the degree for the polynomial root 7 is "zerozero

In the given question we can see there is no variable and and a constant that is root 7 is given. For all constants the degree is always zero. Therefore the degree for the polynomial root 7 is "zerozero

In the given question we can see there is no variable and and a constant that is root 7 is given. For all constants the degree is always zero. Therefore the degree for the polynomial root 7 is "zerozero

In the given question we can see there is no variable and and a constant that is root 7 is given. For all constants the degree is always zero. Therefore the degree for the polynomial root 7 is "zero

Answer 2

Given :

⬤ Sum of three Consecutive Integers is 51 .

To Find :

⬤ Three Consecutive Integers .

Solution :

Let :

• First Consecutive Integer be = x .
• Second Consecutive Integer be = x + 1 .
• Third Consecutive Integer be = x + 2

Now :

$\bf{x+x+1+x+2=51}$

3x + 3 = 51

3x = 51 - 3

3x = 48

x = 48/3

x = 16

Therefore , The Value of x is 16 .

Hence ,

First Consecutive Integer = x

= 16

Second Consecutive Integer = x + 1

= 16 + 1

= 17

Third Consecutive Integer = x + 2

= 16 + 2

= 18

Therefore , The three Consecutive Integers are 16 , 17 and 18 .