Maths-
General
Easy
Question
divide 1984 by 16
- 120
- 121
- 123
- 124
The correct answer is: 124
16) 1984 (124
-16
———
38
-32
———
64
-64
———
00
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What should be the value of x and y ![2 x plus y equals 16](data:image/png;base64,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)
What should be the value of x and y ![2 x plus y equals 16](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAFQAAAAPCAYAAAB6Iuj1AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAMyZLetQAAAexJREFUeNpjYIAAayBeA8SfgPgXEF8A4miGkQfUgLgW6n98wBSIV0HD6wcQbwJie2QFB4E4Eoh5oHwtID4KFRtJYDEQpwHxfzxq0qABqAbl80ET32FChssD8SUaOfz/IA9YXO4DJbQzlBj8A4tYMhB3YBFvhspRM0DnAnE4FvECIG4dgACdSUmutYRme2zgHBCLI/ETgXgKDVJoPBB3oYlxAfEtIBbGYS4hTIn7bgCxJDmByQHEJ6GVFTbgAcR9ULYLEO+lUZb3ghb+yKAeWnEMRJb/AS071wHxN2gFfoZQBS4IxBuA2I2ApbuhNdsFHKmFGikHZO4VJL4oEN+FRvhABOh/aO4ERTQLEDNBEx0ox2Rh06AEDUwVIiwtgMaQHo0rpW9I7D6ovdSOOGLdB2omSWMRNwDip+iCGkA8G1pGEQKwdmsfmYU0KQF6GBrRStDUyTSAtfw2PPb/QuaIQ8sqFiIsU4K2w7ig7dYzRGR5SgJ0IRD7AfFSII4d4GZTFo5Whwa0zoGDLVBBQkAUGkvIAegDbRDTKkALoM2nSwz0A7jcxwbtBCUjJT5zqNtciC17kA1bh6MMWQ6t+WkBAqDu8KNTQBIqc0WhReMXIP4DDWDbodQdBAXkcYZRQDWwDdrJGAVUADrQ8n3IAADwwIsHeNw9lQAAAHx0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bW4+MjwvbW4+PG1pPng8L21pPjxtbz4rPC9tbz48bWk+eTwvbWk+PG1vPj08L21vPjxtbj4xNjwvbW4+PC9tYXRoPpw4nIAAAAAASUVORK5CYII=)
Maths-General
Maths-
Solve ![3 1 fourth divided by 2 over 3](data:image/png;base64,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)
Solve ![3 1 fourth divided by 2 over 3](data:image/png;base64,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)
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A bag contain strips of papers numbered from to 10 . Randomly a strip is picked.
what is the probability, it is a prim enema.
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Maths-General
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A field is in the form of a paralleiogeam with base 300 m and perpendicular distance from the side 500 m . Find the area
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Find the missing value: 2:x::18:27
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Maths-General
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The frequency distribution of daily working expenditure of families in a locality is a follows
![](data:image/png;base64,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)
If the mode of the distribution is RS140, Then the value of
is:
The frequency distribution of daily working expenditure of families in a locality is a follows
![](data:image/png;base64,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)
If the mode of the distribution is RS140, Then the value of
is:
Maths-General
Chemistry-
For the reaction;
; the best combination of reactants is:
For the reaction;
; the best combination of reactants is:
Chemistry-General
Chemistry-
Nitrationofwhichofthefollowingreactantgivesmaximum%ofmetaproduct. (using
HN03/H2S04)
Nitrationofwhichofthefollowingreactantgivesmaximum%ofmetaproduct. (using
HN03/H2S04)
Chemistry-General
Chemistry-
Product(A)of the give nre action is:
Product(A)of the give nre action is:
Chemistry-General