Physics
General
Easy
Question
A force of 8 N acts on an object of mass 5 kg in X- direction and another force of 6 N acts on in in Y . direction. Hence, the magnitude of acceleration of object will be
- 1.5 ms-2
- 2.0 ms-2
- 2.5 ms-2
- 3.5 ms-2
The correct answer is: 2.0 ms-2
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Maths-
If ![vertical line a with not stretchy bar on top vertical line equals 3 comma vertical line b with not stretchy bar on top vertical line equals 4 text and end text left parenthesis a with not stretchy bar on top comma b with not stretchy bar on top right parenthesis equals pi over 2 text , then end text vertical line a with not stretchy bar on top plus b with not stretchy bar on top vertical line equals](data:image/png;base64,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)
If ![vertical line a with not stretchy bar on top vertical line equals 3 comma vertical line b with not stretchy bar on top vertical line equals 4 text and end text left parenthesis a with not stretchy bar on top comma b with not stretchy bar on top right parenthesis equals pi over 2 text , then end text vertical line a with not stretchy bar on top plus b with not stretchy bar on top vertical line equals](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAU4AAAAiCAYAAAAwEjD8AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAWNPAnzwAABfdJREFUeNrtnV9kH1kUx6+IiIpSVVFRoWKtWhFWRcVaofpQUbXUin1YUWqtWmtf+rCqVi2xD2uttVRVRVWJqH2IWGrFT0XkpaJqVah9WCuq9OGnKn7Cb++RM36T+d3fzP03M3d+8/1wyEwm955zz7ln7r1zZyJEvWkrBMAvAPEBAAAAAAAAAKASfC3lfY+pYiQ30EwAANBhScopKStSLsfO0/EcmgdEYBEWIHa6ecUJNOIfKaPwN3IFAEDNIE/X48fv0CwAANCbc1LWE8d/oVnqPdQu8+9Dtq0KNpYNPThZLLC+Ra6zaOal3I8dfy4O1j6RJ2qqMxInEqctk1I2S6h3g+sukt+lLMSOb0v5DYkTiTM05WalrImDdaU9KTtSfpFy3JNuVO5AYEEzF1CA6uhBCWzKc706fvlYytOC2+NVwtYfpTyRMiHlSA2SVSi6BNNvQ02ctJ70mZSh2DkK3D896EbB/jywoBmR8neFEucUJ06fmPjlKSfQIqAtSM8S585KaUp54KH8t0ic3uMDU/UETQ+6UUd4FJiNd6RcrVDi/EnK9RwSlK5fvhHFrq2W0dZ1SJztnOKjlMRJQ+EfpLyW0pKyLWU8AOeelvLSQ8PdkvI927jLSwE0wj1Zko0zovOEVreuS1K22D87XIZK5ys8zSQbG+LwPsSIT9nHLb52QUMPGvl/4hg7Ln7pl6faaXsgo+OL4mAtOc2H9PDqX76GHmINO8SDSR9w8bdp3wqq36oKX5Xyq5Rj3DDL4vAbEybKtTUki1HuzDscRK5OWebguRGz8eeUu1meNg7x9GPc0NkPpZzhn6ltXih0usIjw/HYdY3EdR/yEsFHfExlrmjo0Uwso9jEjotfhlJmHz5iLpQRJ81C1thPvXw4zQOKU9xm17jdbOLBVEcXf5smt5D6bdcv51nBOEspCaudc0DF5VtPAbkTSzoRRzM6Yl4sJqa8NnUN8N0+qfOsxnX32OemNu/3GPWYxI6rX1o1mKo/1PDhY4UPdy3jwURHV3+bxntI/bar8HWeBsVplDxVP8Z3sS2eVrouQ7xXnB8uwQG0pWbDU11ty3WzXcW0zjZxmsaOq19aOfUHV/GZOHV88050v/rZtIwHEx1t/G3bfiH1W2Xhycf9AyL91bIipuoRI5w8XQJyWhx+A0RnzSwvG8mWCUtn3+Q78H7G+liWLfuWNqum6qax4+KXukzVdW+SWTbmkThd/G1af0j9Vln4m8QxPXR45mmo7YM9R6ck3wCJ+I6TUZE22jrtDq9XDXsYce4J9b64LJufiO4HUqax4+KXfnrl0TVx0namI57r0LnOxd+m9YfUb5WF/5fokKTUSiCJc5JHWS5OoYXsBcXohR7QnAzARp26mh6n6uuKBHhc2G1HMo0dF79cZx36gZbhzSt5nhLK1RISp4u/TesPrt8mC7/NI5oBXqugxem1EhJng0dVg6wLLWzTZ7y+TFz3iHW4rKnbY06+5/l4jM8tBHJz0KnrZayjjLHPdvln044yzaPHMW5nentpQ9htgNeNHZXPTP1S5AZ4F9LiM2JbmD2gS56n5R562nyBj6ntlwpInKa5wqX+4PqtqnDaK7XMdxC6o7wW9tuRbKE9gqs8lYz2a80ZBqZKN7LlkuisD26L7O0ToSXOSZ4S0Uhli5NftJfOpqN8IOUPbufoNUodPTZF9zvjOrGj8pmJX8p45TLPxDnL9rusS55l31HbveC2zDtxmuYKF4LrtzqFnwgkqaQF58UcdcNHPnon8E3L2OnlMx2K/sjHDE9Bm6KzyfsLD/FZJXT7wIkK6lxK4WUnlSm+ww4icZbCV8L81cc0n2VB65rXCraxwVPpET4+w8l7Pmdbq5g4a6Nz1RMnrXWM5qwbEmdxPqsKtKb3vCa2InEq2Cv570O2rQo2gurHF2yFzgDUgnPC/2f1AACgb6Gnx7SbYQZNAQAA2dB3E2jr1gU0BQAAZHOak+YEmgIAALKh72HeFfn9fyEAAOgraDsRvR0ziKYAAAA9VkXnC+wAAAA0qMp3PUHO/A80urIrpvnIPQAAAvV0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bW8+fDwvbW8+PG1vdmVyIGFjY2VudD0idHJ1ZSI+PG1pPmE8L21pPjxtbyBzdHJldGNoeT0iZmFsc2UiPiYjeEFGOzwvbW8+PC9tb3Zlcj48bW8+fDwvbW8+PG1vPj08L21vPjxtbj4zPC9tbj48bW8+LDwvbW8+PG1vPnw8L21vPjxtb3ZlciBhY2NlbnQ9InRydWUiPjxtaT5iPC9taT48bW8gc3RyZXRjaHk9ImZhbHNlIj4mI3hBRjs8L21vPjwvbW92ZXI+PG1vPnw8L21vPjxtbz49PC9tbz48bW4+NDwvbW4+PG10ZXh0PiYjeEEwO2FuZCYjeEEwOzwvbXRleHQ+PG1vPig8L21vPjxtb3ZlciBhY2NlbnQ9InRydWUiPjxtaT5hPC9taT48bW8gc3RyZXRjaHk9ImZhbHNlIj4mI3hBRjs8L21vPjwvbW92ZXI+PG1vPiw8L21vPjxtb3ZlciBhY2NlbnQ9InRydWUiPjxtaT5iPC9taT48bW8gc3RyZXRjaHk9ImZhbHNlIj4mI3hBRjs8L21vPjwvbW92ZXI+PG1vPik8L21vPjxtbz49PC9tbz48bWZyYWM+PG1pPiYjeDNDMDs8L21pPjxtbj4yPC9tbj48L21mcmFjPjxtdGV4dD4sIHRoZW4mI3hBMDs8L210ZXh0Pjxtbz58PC9tbz48bW92ZXIgYWNjZW50PSJ0cnVlIj48bWk+YTwvbWk+PG1vIHN0cmV0Y2h5PSJmYWxzZSI+JiN4QUY7PC9tbz48L21vdmVyPjxtbz4rPC9tbz48bW92ZXIgYWNjZW50PSJ0cnVlIj48bWk+YjwvbWk+PG1vIHN0cmV0Y2h5PSJmYWxzZSI+JiN4QUY7PC9tbz48L21vdmVyPjxtbz58PC9tbz48bW8+PTwvbW8+PC9tYXRoPkovq6YAAAAASUVORK5CYII=)
Maths-General
physics
Which of the following statement is correct?
Which of the following statement is correct?
physicsGeneral
physics
A body of 2kg has an initial speed 5 m/S. A force act it for some time in the directive of motion. The force
-me time (t) graph is shown in figure. The final speed of the body is…….
![](data:image/png;base64,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)
A body of 2kg has an initial speed 5 m/S. A force act it for some time in the directive of motion. The force
-me time (t) graph is shown in figure. The final speed of the body is…….
![](data:image/png;base64,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)
physicsGeneral
physics
A vessel containing walker is given a constant acceleration a towards the right, along a straight horizontal path. which of the following diagram opposants the surface of the liquid
A vessel containing walker is given a constant acceleration a towards the right, along a straight horizontal path. which of the following diagram opposants the surface of the liquid
physicsGeneral
physics
The linear momentum P of a particle varies with the time as follows.
Where a and b are constants. The net force acting on the particle is……
The linear momentum P of a particle varies with the time as follows.
Where a and b are constants. The net force acting on the particle is……
physicsGeneral
physics
A vehicle of 100 kg is moving with u velocity of 5 m/s. To slop it in /10 sec, the required force in opposite direction is N
A vehicle of 100 kg is moving with u velocity of 5 m/s. To slop it in /10 sec, the required force in opposite direction is N
physicsGeneral
physics
A ball fills co surface from 10 m height and rebounds tis .2.5 m If duration of contact with floor is .0.01sec the average aceleration during contact is.ms-2
A ball fills co surface from 10 m height and rebounds tis .2.5 m If duration of contact with floor is .0.01sec the average aceleration during contact is.ms-2
physicsGeneral
chemistry-
In group V-A of the periodic table nitrogen forms only a trihalide but other elements form pentahalides also. The reason is
In group V-A of the periodic table nitrogen forms only a trihalide but other elements form pentahalides also. The reason is
chemistry-General
chemistry-
Which of the following elements forms a strongly acidic oxide
Which of the following elements forms a strongly acidic oxide
chemistry-General
chemistry-
Orthophosphoric acid represents the molaysis condition due to
Orthophosphoric acid represents the molaysis condition due to
chemistry-General
chemistry-
Ammonia on reaction with hypochlorite anion, can form
Ammonia on reaction with hypochlorite anion, can form
chemistry-General
chemistry-
In compounds of type
, where
P, As or
, the angles
for different E are in the order
In compounds of type
, where
P, As or
, the angles
for different E are in the order
chemistry-General
chemistry-
On heating ammonium dichromate, the gas evolved is
On heating ammonium dichromate, the gas evolved is
chemistry-General
chemistry-
One mole of calcium phosphide on reaction with excess water gives
One mole of calcium phosphide on reaction with excess water gives
chemistry-General
chemistry-
Which of the following is manufactured from the molecular nitrogen by bacteria
Which of the following is manufactured from the molecular nitrogen by bacteria
chemistry-General