solving the equation \(x^2 + \sqrt{p} x+q=0 yields \Delta= p-4q\)the equatio

1. solving the equation \(x^2 + \sqrt{p} x+q=0 yields \Delta= p-4q\)
2.  
3. the equation has at least one real solution if Delta>=0 meaning p>=4q so q has to be from -b to p/4 thus the probability is
4. \( \frac{b+p/4}{2b} =1/2 + \frac{p}{4b} \)
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6. thus \( dP = \frac{dp}{a}( 1/2 + \frac{p}{4b} ) \)
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8. \(P = ∫^{min(4b,a)}_0 \frac{dp}{a}( 1/2 + \frac{p}{4b} ) +∫^{a}_{min(4b,a)} \frac{dp}{a} \)
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10. \( = [\frac{p}{2a}+ \frac{p^2}{16ba}]^{min(4b,a)}_0 + [\frac{p}{a} ]^{a}_{min(4b,a)} \)
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12. note that if p>4q the probability for a given p is 1
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14. if a<=4b then
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16. \( P= [\frac{p}{2a}+ \frac{p^2}{16ba}]^{a}_0 =\frac{a}{2a}+ \frac{a^2}{16ab} - 0= \frac{1}{2}+ \frac{a}{16b} \)
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18. if a>4b then
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20. \( P= [\frac{p}{2a}+ \frac{p^2}{16ba}]^{4b}_0 +\frac{a-4b}{a} =\)
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22. \( -0 +\frac{4b}{2a}+ \frac{16b^2}{16ab}-0 +\frac{a-4b}{a}=1 -\frac{2b}{2a}= 1- \frac{b}{a} \)