Mathematics
Grade-7
Easy
Question
The product of 0.2 × (-1.78) is ______.
- 0.250
- 0.356
- - 0.356
- 0.450
Hint:
Simply multiply the two numbers to find the product.
The correct answer is: - 0.356
STEP BY STEP SOLUTION
Product of 0.2 & -1.78 is equals to
0.2 × (-1.78) = ![2 over 10 space cross times space minus 178 over 100 space equals space minus fraction numerator 356 over denominator 1000 space end fraction equals space minus 0.356](data:image/png;base64,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)
The product = -0.356
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![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAvAAAACJCAYAAABKFAxaAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAABNCSURBVHhe7d3LjxVFH8bx4t0roHHjguBlI/gGE9HkNZoYF4yRjQkiChsTDd6Il40IiCOIIl6iJuKFxMSFr3gNxgQimKjJGN94ieL7etl4Cws3YgbiH8DbT0/1UFPT50z3mXPqcs73kxTTfWbmTFFdXf2r6qo+C04VDAAAAIAs/MN+BQAAAJABAngAAAAgIwTwAAAAQEYI4AEAAICMEMADAAAAGSGABwAAADJCAA8AAABkhAAeAAAAyAgBPAAAAJARAngAAAAgIwTwAAAAQEYI4AEAAICMEMADAAAAGSGABwAAADJCAA8AAABkhAAeAAAAyAgBPAAAAJARAngAAAAgIwTwAAAAQEYI4AEAAICMEMADAAAAGSGABwAAADJCAA8AAABkhAAeAAAAyAgBPAAAAJARAngAAAAgIwTwAAAAQEYI4AEAAICMEMADAAAAGSGABwAAADJCAA8AAABkhAAeAAAAyAgBPAAAAJARAngAAAAgIwTwAAAAQEYWnCrY7ZHxyCOP2K3T6l7DaSmXWYp5o7zaI1+9ST1/KUq1zFI+lpTZ8KDMhsNIBvALFiywW6elUgypnlgpl1mKeaO82iNfvUk1fykHCdS19iizdqj/7aVcZikigLdSKQYayfZSzBvl1R756g3l1h5l1h5l1g7Hsr2UyyxFzIEHAADol0OHzJbiy7+L9N8iKQTVV7NhgzG7d5ffB+aLEXiLnnF3lFk7lFd75Ks3lFt7lFl7lFkDP/5ozMMPG/Pee/aFLtasMWbnTmOWLbMvhMOxHA59G4E/ceJEOVfpueees68AAACMgO3bjVm+vFnwLvo5/bx+D9lS3Hv//ffbvbDmHcBXgft5551nduzYUe4DAACMhD17jNm1y+60pN/T7yNbGrjW3YPQgXzPATyBOwAAGGmHDxvz4IN2p0f6fb0PshY6kG8dwBO4AwCAkXfypDEbN9qdedL76P2QvVCBfOMAnsAdAADAOnLEmGPH7M486X30fhgaAw/kT81hcnLy1Pj4+KlFixZpKTCJRCKRSCTSyKdnilRs9C3p/er+Dmk40n333Wcj6/7o+BhJjbCr9/D8888z2g4AAOD4vEj/mtrsi/8U6YqpTQyxIpA3zz77rN3rXW0Ar4BdU2UI3AEAAGarHf2cp9lPQscwWrRokfn222/N0qVL7Svt1c6B1xtPTk72pYcAAAAwbDRi3k/9fj+kR/H1+Pi4+e233+YVvEvXRawa5tcAPYE8AADAaQTwaMoN3PVAGO3PV8c58HU0J36u1bTKoDKXspQ/rjfVvFFm7VBe7ZGv3lBu7VFm7VFmNd55x5gbb7Q7ffD228asXWt3Bodj2T+Kd/Vkxk4UqN97773lgHg/gnZXq+fAMyIPAABQWLXKmCVL7M486X30fhgKgxhx97X+ICchkAcAACNt4UJj9u2zO/Ok99H7IWshAvdKTwF8hUAeAACMrLExY554wu70SL+v90G2QgbulXkF8BUCeQAAMJI2bzbmoYfsTkv6Pf0+shQjcK+0WsQ6LFgo1B5l1g7l1R756g3l1h5l1h5l1sCPPxrz8MPGvPeefaGLNWuM2bnTmGXL7AvhcCyHAwG8lUoxcGK1l2LeKK/2yFdvKLf2KLP2KLMWDh0yW1evNhcXm/+06X/6un69MRcXr65YYcx11xWvxMGxHA4E8FYqxcCJ1V6KeaO82iNfvaHc2qPM2qPM2rlYgbrn+++/t1txcSyHw0gG8J9++qndOu3qq6+2W3GlWoFTLrMU80Z5tUe+epNq/lK+GFPX2qPMhkeq5+bevXvt1ml333233YJvJAP4lNEYARgGtGVAmv7880+7ddo555xjt5ALAngAaOiVV14xW7ZsMZOTk+X+0aNHzQrNZwUAIKC+PEYSAIbZr7/+aq699lpzxx13TAfv8vfff9stAADCGdkA/s033ywvyGeddVY5H0zpwgsvNHfddVd5scZsVZlV5aWkfY1KIj+fffaZ2bZtm7nssstmHFPtP/nkk+avv/6yPxnGd999V+bHr2PKj+pY6PxUVBYXXHCBOXz4sH0lHTqGN91004x2LNbx8+nv63hW+VIeU5BqPcuF6ptbbjquKlPUUzyhuELxRVVmVaxBuWFeNIVmlBw/fvzU2NiYpg11TIsXLz41MTFhfyOcgwcP1uanLimPoRw9evTUypUra/NRJeRl//79tcfRTTrmOl9CaFL3Q+bH5f79l19+eUaeYrQTlbmOYazyEpVL0emZlafYUq5nKrOtW7eWf9/Pz549e6IdS1enOhfzPJB169bV5stNd955p/3pcHTc6vJSJX0f6NXIjcC/+uqrc46k6Rb5LbfcYvfCafOIKfc2/iBpNGrNmjXm66+/tq+kRSMY7mhQpxTjrkrKI1XHjh2zW53pmOt8CaFJ3Q+ZH18RWJkPP/zQLF++3L4Sl0beb775ZrtXT+W1fft2uxeG2gvV+6uuusr88ssv9tV0pFrPdHdTZfb444/Pamu1v3nz5vKOQcy7A/rbGjVO0YkTJ+xWZ6GvAbqbo+OGdpgd0dzIBfD79u2zW8asXLmyvMgUHZnya9FDt98xUS4+dc+NjU0XMrcs9uzZM11mShMTE+VrsTSdg/zHH3/YrTDUCL311lt2b4o6XanMmV64cGFZ//fv3z99PI8fPz7jHJCPP/7Ybg2Wmx/lozon9ZrLPX9DUT4ee+wxc/bZZ9tX4nvhhRfsljGLFy8uz8O6MnvppZeCBn0//fTTdL1ft25d2fFJSar1LLUOdR11BquBo7GxsfJrTi699FK7NXg657TYvaL6dfDgwbK+VXVOdfCKK66wPzFYyo87mDRXijHQpDwqcNfAhAZZ3UFKlZfaMpWjBi9gFZVppOi/XCX/9pVuA7rfT4lun2raTJU33TIMwf2bmj6QGv+YdUohbz/7x8pNsW81z0V5d/Or6WYx1U15iMmvbzGOp3+M/HbMLzPth6LyUN2v2grlzc1LqmLXM5VXEZyUU1SKYKV8TcdZ0z7cPMU6H916r6lRfnnFbtfcabGx8yLuVDuVV8jrTx33+DVJMcrQbys6JZUnpozcCLw70vLNN9/YrSk//PCD3UpvhOHdd9+d0SPdtGmT3Roc9XTdv3n77bfbrTTpmBV1ujaFHD3NeaTq5MmTdmvK+eefb7fiOPPMM+3WFH+kdBRplNvlj+Jd531Ee8hPf7zyyivLkeLU2wpf7Hqm8vrqq6/K6UfVOac269FHHy23Y3OnlL722muzygszHThwwG4Zs3Hjxuh37y666CK7la6UZ0ekauQC+B07dtgtU97q1S2bQ4cOlU9t0CPiRLekY04LqfPUU0/ZLVM+EUMXykH7/PPP7dZUIOo/hUZz1JiXNpM6PbrVJzpO99xzT7mdA50HmvbgWr9+vd2Kw+1Ui54UMur8MqlrC9SGVX7//Xe7FUbsTl8vUq1nKXSodW2sgia1DyGuPblz19ktWbJk1lNoVL90PQ1FHQh/UMtN7kCT2o4Yx9gNzNeuXTtd1/U19nUoWcXBGzm6Tan/el3S7Rk9dSUlfn61H0LTW1q6ZR6rzNxbg0UjZF+NR/Wnyo/y5t+6jHFrshMdMzdvbtL/I+TUizq67eyWp1LRyNvvzl+3dqBTfU7heDaZlqJzofp+zPMihyk0g65nvdL5p2k1br5C1ze3jVA7X5VLau2aW9/dpOOqaUih81eXl7qkvMXmXwd0zsbg1nV/irA7JSmF63wqRvI58LpNWVQIuzeTesmpeeaZZ+zWVO9Y+U+Jpovs3r3b7sWjUY9qhENJdwtCPtc5t5GqbgtqV61aFf02uaYiuaMyuivWzxHIbgsH+YCm0THoetaU/0St1atXTz+RpghEy0WQodsU9ykqauNjlMt86Ljqjqie8BNyxLsp5S32k8n8z3G54YYb7FZYuc6OiMoG8kPBX/BTJY0cVDTaot6d+/263nuoUe65+CMd/eodayTFfV83dVqApn39nuirPzoUg18+dUn5HPQiopRGqpqOLPsjL3WpHyNEvYx0++eyPyLTD3ULF6tUHT9fjOPp88/LOozANxOinjXVrS1TPkPXNff8UBvqSuE8cHUagfdTp/O639y/qbJz72a6o8lK/bqm90Ll4ealH+39fHS7VuhuSqfrxagaqhH4TnOx3YWYGzZsmH7MWXFilT10Pd+5qBgzFi7pUUb9ntvtzoFzU7cR9V27dtmtKf3qHXd7rKI/77LywAMPzJiX5vaYU6ZRrEE/DzulkaqmI8srVqxQRDWddC4UFxP73SkaIZrvY7vajnRrRKhaRyA6L/fu3Wv3+keLPd3/v5tyG2n0/fzzz3bLmGuuucZuwRWqnjV1xhln2K3ZqlHkkM9hdxc/qw11r1nKi0v7ej3kI0tdL774YnkNd89h3bFwr+mih0GEpvnc7sJyLVj28xWL/1jS2IvPc5sdEdtQBfCdnvOq24+iW1Xu4hIF7tWFWsGM9l39PtkVINXp9CEU6kC4+S16x30LLLqtSteimyYGPcVCFyv3olElLZ6t6JbyxMTE9DOdlToFor3Srde6fCipTuk2X3Wc1DDHbgS7fZ7Aueeea7dmU91SJ81/dre7mLkXbfKjsq5ul4rKU+dlSs9gj81/6kxdB6tTW4MpKdazUB3qQfKfkBSK2i6Vn0tBs/9ZHKE+12IuKbRn6my518WxsbFZZRiS8qMA3j0vlaeKrrGXXHJJklOhYhmqAF4ftuI2gFWqRqPcYFj8k2jQJ1WnXnenoPzpp5+2W1P6uRJb/9e6slKq7gj4gbw/V89/ckO/NbmjIgri3WNXBaLq8Lh6vfDNNYKc2khVaiPLTfOjhtn9dNFUgnd1GOc6nkr+XNJB8Ts9/nmoDqUr1IfF5CLVeuar2rF+d6ibajqQ40rtcYUx2jupBg3Ff1y1fPnll3YrHo2+u9fSGJ8+74o5OyJXI7WI1W+Q3EcgKqDatm1buT0oes5vXRCj238+5cvvHYdewHT55ZfbrSm33XbbdHkpGHY/aU6LNvttrjsqc1m6dKndmp9eR7S7iTVSVdECIdV/BXtVZ0JfFdz4dytCfEKw6lOqQZXfYeyk09SzflNQ4p4DOg+rzqnOz/Hx8XJb9HOpL6YOKeV6lhoN5NRdr5R019Olfb2eWjn6gzahppPpIQAVBaVV515trNpdt01xR5lDcp+7rnai21TeQYs9OyJbxUk3MooeXe3iiE5JPx+Lv/gr1qLapouDUlxc4ud9ULotvOmUBr2odi5Nj2sR4NjfGKym+VGqFlmHUlzcavPhp5DnaNM6F7qs1A7U5aMuxWgzUq1nypcWEGqxY9U26KuOsxbFu/lyF0TGktIiVh0nlZ9bdqJ9/9wNlU+/fDqlWIum/fYj5kJa8eOdOu73Y+c3FSMVwEvTC1/Ii7FPjZDbaKsRikWdGP8C4qeYZaWy0cnsBgPK89atW2fkUQ18DCld6Fz+k5jqkoL3UB2NNoEVjfcUBXx15VOlGE+UaBq4KMU4F1KtZ03zFapDPZeU2jU/+OuUQgfL/jXITyHbV5/bsdH1PVY+Kn5cprarGkBV3vyy5BowZeQCeFGwpwqiE8itFNpXRYk58i4aUXDzFbuyVieQe9Jr2z3JYnHLqVuKdYcgpQudS8dUjaYuam4HTdt6LXSnrEmHokqhR5VTpuPkB38qy1ijtGoP3Lx0SzHajlTrWZN8xQz4fDp2Vbuhr7HaV/GDv7qk8o1RdjoP/WOr8zV0++ryr0kxOvq+Nu2GUuy4IxUL9E9RIEiI5qJVizmKQNl88cUXzNHsQI+WKk5muzdbcXExr7/++ozHeIWkOZjuwsei8WROMoAZNDf6o48+Mu+//745cuTI9BxptV+aT3399ddHnaOcOrWzb7zxRll21fVA186i02M2bdpEm+vQ+id3vrnKK9ZiX5e/uLyTovPDuWARwCNruvBpQcuBAwdmNEpjY2PlgqVbb701audHiwp1EdEFWRfjTz75JOqjugAAo0mLRfUoxoquk/4C0ZiUPy341QM/qk8hFl1D1ZHV9TyFzkYqCOABAACGnILj6jnrGlD64IMPuDuRMQJ4AAAAICMj9Rx4AAAAIHcE8AAAAEBGCOABAACAjBDAAwAAABkhgAcAAAAyQgAPAAAAZIQAHgAAAMgIATwAAACQEQJ4AAAAICME8AAAAEBGCOABAACAjBDAAwAAABkhgAcAAAAyQgAPAAAAZIQAHgAAAMgIATwAAACQEQJ4AAAAICME8AAAAEBGCOABAACAjBDAAwAAABkhgAcAAAAyQgAPAAAAZIQAHgAAAMgIATwAAACQEQJ4AAAAICME8AAAAEBGCOABAACAjBDAAwAAABkhgAcAAAAyQgAPAAAAZIQAHgAAAMgIATwAAACQEQJ4AAAAICME8AAAAEBGCOABAACAjBDAAwAAABkhgAcAAAAyQgAPAAAAZIQAHgAAAMgIATwAAACQEQJ4AAAAICME8AAAAEBGCOABAACAjBDAAwAAABkhgAcAAAAyQgAPAAAAZIQAHgAAAMgIATwAAACQEQJ4AAAAICME8AAAAEBGCOABAACAjBDAAwAAABkhgAcAAACyYcz/ARjZmq62ZjU1AAAAAElFTkSuQmCC)
Graph the opposite of the number shown on the number line.
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)
MathematicsGrade-7
Mathematics
Graph the opposite of the number shown on the number line.
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)
Graph the opposite of the number shown on the number line.
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)
MathematicsGrade-7
Mathematics
Graph the opposite of the number shown on the number line.
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)
Graph the opposite of the number shown on the number line.
![](data:image/png;base64,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)
MathematicsGrade-7
Mathematics
Write the opposite of the number in the given figure.
![](data:image/png;base64,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)
Write the opposite of the number in the given figure.
Write the opposite of the number in the given figure.
![](data:image/png;base64,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)
Write the opposite of the number in the given figure.
MathematicsGrade-7