write a letter to your younger brother explaining him the uses of morning walk and balanced diet in english
Answers
Answer:
Explanation:
25/34, Punjabi Bagh
New Delhi
5 December, 20XX
Dear Anuj,
why you did not to walk in morning and keep balance diet you should do it because for keeping good health important and if you not do it you will be ill so please from tomorrow you go on morning walk and keep your balance diet
I am glad to know that Mohan uncle met you recently in your boarding school hostel. He has called Papa to tell him that you have lost weight and you look very weak. It is good that you are an exceptionally brilliant student. But at the same time, you should take care of your health as well. Nobody can excel in life if health is not sound. An unhealthy physique can never allow the mind to function properly. To have a sound mind, a sound body is equally essential.
So take a healthy and nutritious diet. Get up early in the morning. Go for a walk and exercise or do yoga. You should also start playing some game. Swimming is again a very healthy sport to enroll in. Team spirit, discipline, and physical fitness are the key to success in life.
I hope next time when you come home, you look healthier, fit and fine.
With lots of love and affection.
Yours affectionately,
Ankur
1THANK YOU
Answer:
To divide the polynomial (3y^3 - 18y^2 - 8y - 8) by (4y - 8), we can use long division. Here are the steps:
1. Write the dividend (3y^3 - 18y^2 - 8y - 8) and the divisor (4y - 8) in long division format:
________________________
(4y - 8) | 3y^3 - 18y^2 - 8y - 8
2. Divide the first term of the dividend (3y^3) by the first term of the divisor (4y). Write the result above the line:
________________________
(4y - 8) | 3y^3 - 18y^2 - 8y - 8
- 3y^2
3. Multiply the divisor (4y - 8) by the result of the previous step (- 3y^2), and write the result below the line:
________________________
(4y - 8) | 3y^3 - 18y^2 - 8y - 8
- 3y^2
________________________
3y^3 - 6y^2
4. Subtract the result obtained in the previous step (3y^3 - 6y^2) from the corresponding terms of the dividend (3y^3 - 18y^2). Write the result below the line:
________________________
(4y - 8) | 3y^3 - 18y^2 - 8y - 8
- 3y^2
________________________
3y^3 - 6y^2
_____________
- 12y^2
5. Bring down the next term from the dividend (- 8y):
________________________
(4y - 8) | 3y^3 - 18y^2 - 8y - 8
- 3y^2
________________________
3y^3 - 6y^2
_____________
- 12y^2 - 8y
6. Repeat steps 2-5 with the new expression (- 12y^2 - 8y).
7. Continue this process until all terms of the dividend have been divided.
At the end of the long division process, you will have the quotient and remainder of the division. The quotient represents the result when dividing (3y^3 - 18y^2 - 8y - 8) by (4y - 8).
Note: If there is no remainder (i.e. the last step results in a term with degree less than the divisor), the division is exact.